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{{DISPLAYTITLE:Peirce's 1870 Logic Of Relatives}}
 
{{DISPLAYTITLE:Peirce's 1870 Logic Of Relatives}}
'''Author's Note.''' The text that follows is a collection of notes that will eventually be developed into a paper on [[Charles Sanders Peirce]]'s [[Logic of Relatives (1870)|1870 memoir on the logic of relative terms]]. [[User:Jon Awbrey|Jon Awbrey]] 06:06, 8 October 2007 (PDT)
+
'''Note.''' The MathJax parser is not rendering this page properly.<br>Until it can be fixed please see the [http://intersci.ss.uci.edu/wiki/index.php/Peirce's_1870_Logic_Of_Relatives InterSciWiki version].
  
----
+
'''Author: [[User:Jon Awbrey|Jon Awbrey]]'''
  
==Selection 1==
+
Peirce's text employs lower case letters for logical terms of general reference and upper case letters for logical terms of individual reference.&nbsp; General terms fall into types &mdash; absolute terms, dyadic relative terms, higher adic relative terms &mdash; and Peirce employs different typefaces to distinguish these.&nbsp; The following Tables indicate the typefaces that are used in the text below for Peirce's examples of general terms.
 +
 
 +
<br>
  
<pre>
+
{| align="center" cellspacing="6" width="90%"
| The letters of the alphabet will denote logical signs.
+
|+ <math>\text{Absolute Terms (Monadic Relatives)}\!</math>
| Now logical terms are of three grand classes.
 
 
|
 
|
| The first embraces those whose logical form involves only the
+
<math>\begin{array}{ll}
| conception of quality, and which therefore represent a thing
+
\mathrm{a}. & \text{animal}
| simply as "a ---". These discriminate objects in the most
+
\\
| rudimentary way, which does not involve any consciousness
+
\mathrm{b}. & \text{black}
| of discrimination.  They regard an object as it is in
+
\\
| itself as 'such' ('quale');  for example, as horse,
+
\mathrm{f}. & \text{Frenchman}
| tree, or man.  These are 'absolute terms'.
+
\\
 +
\mathrm{h}. & \text{horse}
 +
\\
 +
\mathrm{m}. & \text{man}
 +
\\
 +
\mathrm{p}. & \text{President of the United States Senate}
 +
\\
 +
\mathrm{r}. & \text{rich person}
 +
\\
 +
\mathrm{u}. & \text{violinist}
 +
\\
 +
\mathrm{v}. & \text{Vice-President of the United States}
 +
\\
 +
\mathrm{w}. & \text{woman}
 +
\end{array}</math>
 +
|}
 +
 
 +
<br>
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 +
|+ <math>\text{Simple Relative Terms (Dyadic Relatives)}\!</math>
 
|
 
|
| The second class embraces terms whose logical form involves the
+
<math>\begin{array}{ll}
| conception of relation, and which require the addition of another
+
\mathit{a}. & \text{enemy}
| term to complete the denotation. These discriminate objects with a
+
\\
| distinct consciousness of discrimination. They regard an object as
+
\mathit{b}. & \text{benefactor}
| over against another, that is as relative;  as father of, lover of,
+
\\
| or servant of.  These are 'simple relative terms'.
+
\mathit{c}. & \text{conqueror}
 +
\\
 +
\mathit{e}. & \text{emperor}
 +
\\
 +
\mathit{h}. & \text{husband}
 +
\\
 +
\mathit{l}. & \text{lover}
 +
\\
 +
\mathit{m}. & \text{mother}
 +
\\
 +
\mathit{n}. & \text{not}
 +
\\
 +
\mathit{o}. & \text{owner}
 +
\\
 +
\mathit{s}. & \text{servant}
 +
\\
 +
\mathit{w}. & \text{wife}
 +
\end{array}</math>
 +
|}
 +
 
 +
<br>
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 +
|+ <math>\text{Conjugative Terms (Higher Adic Relatives)}\!</math>
 
|
 
|
| The third class embraces terms whose logical form involves the
+
<math>\begin{array}{ll}
| conception of bringing things into relation, and which require
+
\mathfrak{b}. & \text{betrayer to ------ of ------}
| the addition of more than one term to complete the denotation.
+
\\
| They discriminate not only with consciousness of discrimination,
+
\mathfrak{g}. & \text{giver to ------ of ------}
| but with consciousness of its origin. They regard  an object
+
\\
| as medium or third between two others, that is as conjugative;
+
\mathfrak{t}. & \text{transferrer from ------ to ------}
| as giver of --- to ---, or buyer of --- for --- from ---.
+
\\
| These may be termed 'conjugative terms'.
+
\mathfrak{w}. & \text{winner over of ------ to ------ from ------}
 +
\end{array}</math>
 +
|}
 +
 
 +
<br>
 +
 
 +
Individual terms are taken to denote individual entities falling under a general term.  Peirce uses upper case Roman letters for individual terms, for example, the individual horses <math>\mathrm{H}, \mathrm{H}^{\prime}, \mathrm{H}^{\prime\prime}</math> falling under the general term <math>\mathrm{h}\!</math> for ''horse''.
 +
 
 +
The path to understanding Peirce's system and its wider implications for logic can be smoothed by paraphrasing his notations in a variety of contemporary mathematical formalisms, while preserving the semantics as much as possible.  Remaining faithful to Peirce's orthography while adding parallel sets of stylistic conventions will, however, demand close attention to typography-in-context.  Current style sheets for mathematical texts specify italics for mathematical variables, with upper case letters for sets and lower case letters for individuals.  So we need to keep an eye out for the difference between the individual <math>\mathrm{X}\!</math> of the genus <math>\mathrm{x}\!</math> and the element <math>x\!</math> of the set <math>X\!</math> as we pass between the two styles of text.
 +
 
 +
__TOC__
 +
 
 +
==Selection 1==
 +
 
 +
===Use of the Letters===
 +
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| The conjugative term involves the conception of 'third', the relative that of
+
<p>The letters of the alphabet will denote logical signs.</p>
| second or 'other', the absolute term simply considers 'an' object.  No fourth
+
 
| class of terms exists involving the conception of 'fourth', because when that
+
<p>Now logical terms are of three grand classes.</p>
| of 'third' is introduced, since it involves the conception of bringing objects
+
 
| into relation, all higher numbers are given at once, inasmuch as the conception
+
<p>The first embraces those whose logical form involves only the conception of quality, and which therefore represent a thing simply as &ldquo;a&nbsp;&mdash;&mdash;&rdquo;.  These discriminate objects in the most rudimentary way, which does not involve any consciousness of discriminationThey regard an object as it is in itself as ''such'' (''quale'');  for example, as horse, tree, or man.  These are ''absolute terms''.</p>
| of bringing objects into relation is independent of the number of members of the
 
| relationshipWhether this 'reason' for the fact that there is no fourth class
 
| of terms fundamentally different from the third is satisfactory of not, the fact
 
| itself is made perfectly evident by the study of the logic of relatives.
 
|
 
| C.S. Peirce, CP 3.63
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
</pre>
 
  
==Commentary Note 1==
+
<p>The second class embraces terms whose logical form involves the conception of relation, and which require the addition of another term to complete the denotation.  These discriminate objects with a distinct consciousness of discrimination.  They regard an object as over against another, that is as relative;  as father of, lover of, or servant of.  These are ''simple relative terms''.</p>
  
<pre>
+
<p>The third class embraces terms whose logical form involves the conception of bringing things into relation, and which require the addition of more than one term to complete the denotation.  They discriminate not only with consciousness of discrimination, but with consciousness of its origin.  They regard  an object as medium or third between two others, that is as conjugative;  as giver of&nbsp;&mdash;&mdash; to&nbsp;&mdash;&mdash;, or buyer of&nbsp;&mdash;&mdash; for&nbsp;&mdash;&mdash; from&nbsp;&mdash;&mdash;. These may be termed ''conjugative terms''.</p>
I am going to experiment with an interlacing commentary
 
on Peirce's 1870 "Logic of Relatives" paper, revisiting
 
some critical transitions from several different angles
 
and calling attention to a variety of puzzles, problems,
 
and potentials that are not so often remarked or tapped.
 
  
What strikes me about the initial installment this time around is its
+
<p>The conjugative term involves the conception of ''third'', the relative that of second or ''other'', the absolute term simply considers ''an'' object.  No fourth class of terms exists involving the conception of ''fourth'', because when that of ''third'' is introduced, since it involves the conception of bringing objects into relation, all higher numbers are given at once, inasmuch as the conception of bringing objects into relation is independent of the number of members of the relationship.  Whether this ''reason'' for the fact that there is no fourth class of terms fundamentally different from the third is satisfactory or not, the fact itself is made perfectly evident by the study of the logic of relatives.</p>
use of a certain pattern of argument that I can recognize as invoking
 
a "closure principle", and this is a figure of reasoning that Peirce
 
uses in three other places:  his discussion of "continuous relations",
 
his definition of sign relations, and in the pragmatic maxim itself.
 
  
One might also call attention to the following two statements:
+
<p>(Peirce, CP 3.63).</p>
 +
|}
  
| Now logical terms are of three grand classes.
+
I am going to experiment with an interlacing commentary on Peirce's 1870 &ldquo;Logic of Relatives&rdquo; paper, revisiting some critical transitions from several different angles and calling attention to a variety of puzzles, problems, and potentials that are not so often remarked or tapped.
  
| No fourth class of terms exists involving the conception of 'fourth',
+
What strikes me about the initial installment this time around is its use of a certain pattern of argument that I can recognize as invoking a ''closure principle'', and this is a figure of reasoning that Peirce uses in three other places:  his discussion of [[continuous predicates]], his definition of [[sign relations]], and in the [[pragmatic maxim]] itself.
| because when that of 'third' is introduced, since it involves the
 
| conception of bringing objects into relation, all higher numbers are
 
| given at once, inasmuch as the conception of bringing objects into
 
| relation is independent of the number of members of the relationship.
 
</pre>
 
  
==Selection 2==
+
One might also call attention to the following two statements:
  
<pre>
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
| Numbers Corresponding to Letters
 
 
|
 
|
| I propose to use the term "universe" to denote that class of individuals
+
<p>Now logical terms are of three grand classes.</p>
| 'about' which alone the whole discourse is understood to run.  The universe,
+
|-
| therefore, in this sense, as in Mr. De Morgan's, is different on different
 
| occasions. In this sense, moreover, discourse may run upon something which
 
| is not a subjective part of the universe;  for instance, upon the qualities
 
| or collections of the individuals it contains.
 
 
|
 
|
| I propose to assign to all logical terms, numbers;  to an absolute term,
+
<p>No fourth class of terms exists involving the conception of ''fourth'', because when that of ''third'' is introduced, since it involves the conception of bringing objects into relation, all higher numbers are given at once, inasmuch as the conception of bringing objects into relation is independent of the number of members of the relationship.</p>
| the number of individuals it denotes;  to a relative term, the average
+
|}
| number of things so related to one individual.  Thus in a universe of
 
| perfect men ('men'), the number of "tooth of" would be 32.  The number
 
| of a relative with two correlates would be the average number of things
 
| so related to a pair of individuals;  and so on for relatives of higher
 
| numbers of correlates.  I propose to denote the number of a logical term
 
| by enclosing the term in square brackets, thus ['t'].
 
|
 
| C.S. Peirce, CP 3.65
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
</pre>
 
  
==Commentary Note 2==
+
==Selection 2==
  
<pre>
+
===Numbers Corresponding to Letters===
Peirce's remarks at CP 3.65 are so replete with remarkable ideas,
 
some of them so taken for granted in mathematical discourse that
 
they usually escape explicit mention, and others so suggestive
 
of things to come in a future remote from his time of writing,
 
and yet so smoothly introduced in passing that it's all too
 
easy to overlook their consequential significance, that I
 
can do no better here than to highlight these ideas in
 
other words, whose main advantage is to be a little
 
more jarring to the mind's sensibilities.
 
  
| Numbers Corresponding to Letters
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
|
 
| I propose to use the term "universe" to denote that class of individuals
 
| 'about' which alone the whole discourse is understood to run.  The universe,
 
| therefore, in this sense, as in Mr. De Morgan's, is different on different
 
| occasions.  In this sense, moreover, discourse may run upon something which
 
| is not a subjective part of the universe;  for instance, upon the qualities
 
| or collections of the individuals it contains.
 
 
|
 
|
| I propose to assign to all logical terms, numbers; to an absolute term,
+
<p>I propose to use the term &ldquo;universe&rdquo; to denote that class of individuals ''about'' which alone the whole discourse is understood to runThe universe, therefore, in this sense, as in Mr.&nbsp;De&nbsp;Morgan's, is different on different occasionsIn this sense, moreover, discourse may run upon something which is not a subjective part of the universe;  for instance, upon the qualities or collections of the individuals it contains.</p>
| the number of individuals it denotes;  to a relative term, the average
 
| number of things so related to one individualThus in a universe of
 
| perfect men ('men'), the number of "tooth of" would be 32The number
 
| of a relative with two correlates would be the average number of things
 
| so related to a pair of individualsand so on for relatives of higher
 
| numbers of correlates.  I propose to denote the number of a logical term
 
| by enclosing the term in square brackets, thus ['t'].
 
|
 
| C.S. Peirce, 'Collected Papers', CP 3.65
 
  
1.  This mapping of letters to numbers, or logical terms to mathematical quantities,
+
<p>I propose to assign to all logical terms, numbers;  to an absolute term, the number of individuals it denotes;  to a relative term, the average number of things so related to one individual.  Thus in a universe of perfect men (''men''), the number of &ldquo;tooth of&rdquo; would be 32.  The number of a relative with two correlates would be the average number of things so related to a pair of individuals;  and so on for relatives of higher numbers of correlatesI propose to denote the number of a logical term by enclosing the term in square brackets, thus <math>[t].\!</math></p>
    is the very core of what "quantification theory" is all about, and definitely
 
    more to the point than the mere "innovation" of using distinctive symbols
 
    for the so-called "quantifiers"We will speak of this more later on.
 
  
2. The mapping of logical terms to numerical measures,
+
<p>(Peirce, CP 3.65).</p>
    to express it in current language, would probably be
+
|}
    recognizable as some kind of "morphism" or "functor"
 
    from a logical domain to a quantitative co-domain.
 
  
3. Notice that Peirce follows the mathematician's usual practice,
+
Peirce's remarks at CP 3.65 are so replete with remarkable ideas, some of them so taken for granted in mathematical discourse that they usually escape explicit mention, and others so suggestive of things to come in a future remote from his time of writing, and yet so smoothly introduced in passing that it's all too easy to overlook their consequential significance, that I can do no better here than to highlight these ideas in other words, whose main advantage is to be a little more jarring to the mind's sensibilities.
    then and now, of making the status of being an "individual" or
 
    a "universal" relative to a discourse in progress.  I have come
 
    to appreciate more and more of late how radically different this
 
    "patchwork" or "piecewise" approach to things is from the way of
 
    some philosophers who seem to be content with nothing less than
 
    many worlds domination, which means that they are never content
 
    and rarely get started toward the solution of any real problem.
 
    Just my observation, I hope you understand.
 
  
4.  It is worth noting that Peirce takes the "plural denotation"
+
:* This mapping of letters to numbers, or logical terms to mathematical quantities, is the very core of what "quantification theory" is all about, and definitely more to the point than the mere "innovation" of using distinctive symbols for the so-called "quantifiers".  We will speak of this more later on.
    of terms for granted, or what's the number of a term for,
 
    if it could not vary apart from being one or nil?
 
  
5.  I also observe that Peirce takes the individual objects of a particular
+
:* The mapping of logical terms to numerical measures, to express it in current language, would probably be recognizable as some kind of "morphism" or "functor" from a logical domain to a quantitative co-domain.
    universe of discourse in a "generative" way, not a "totalizing" way,
 
    and thus they afford us with the basis for talking freely about
 
    collections, constructions, properties, qualities, subsets,
 
    and "higher types", as the phrase is mint.
 
</pre>
 
  
==Selection 3==
+
:* Notice that Peirce follows the mathematician's usual practice, then and now, of making the status of being an "individual" or a "universal" relative to a discourse in progress.  I have come to appreciate more and more of late how radically different this "patchwork" or "piecewise" approach to things is from the way of some philosophers who seem to be content with nothing less than many worlds domination, which means that they are never content and rarely get started toward the solution of any real problem.  Just my observation, I hope you understand.
  
<pre>
+
:* It is worth noting that Peirce takes the "plural denotation" of terms for granted, or what's the number of a term for, if it could not vary apart from being one or nil?
| The Signs of Inclusion, Equality, Etc.
+
 
 +
:* I also observe that Peirce takes the individual objects of a particular universe of discourse in a "generative" way, not a "totalizing" way, and thus they afford us with the basis for talking freely about collections, constructions, properties, qualities, subsets, and "higher types", as the phrase is mint.
 +
 
 +
==Selection 3==
 +
 
 +
===The Signs of Inclusion, Equality, Etc.===
 +
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| I shall follow Boole in taking the sign of equality to signify identity.
+
<p>I shall follow Boole in taking the sign of equality to signify identity. Thus, if <math>\mathrm{v}\!</math> denotes the Vice-President of the United States, and <math>\mathrm{p}~\!</math> the President of the Senate of the United States,</p>
| Thus, if v denotes the Vice-President of the United States, and p the
+
|-
| President of the Senate of the United States,
+
| align="center" | <math>\mathrm{v} = \mathrm{p}\!</math>
 +
|-
 
|
 
|
| v = p
+
<p>means that every Vice-President of the United States is President of the Senate, and every President of the United States Senate is Vice-President.</p>
 +
 
 +
<p>The sign &ldquo;less than&rdquo; is to be so taken that</p>
 +
|-
 +
| align="center" | <math>\mathrm{f} < \mathrm{m}~\!</math>
 +
|-
 
|
 
|
| means that every Vice-President of the United States is President of the
+
<p>means that every Frenchman is a man, but there are men besides Frenchmen.  Drobisch has used this sign in the same sense.  It will follow from these significations of <math>=\!</math> and <math><\!</math> that the sign <math>-\!\!\!<\!</math> (or <math>\leqq</math>, &ldquo;as small as&rdquo;) will mean &ldquo;is&rdquo;.  Thus,</p>
| Senate, and every President of the United States Senate is Vice-President.
+
|-
| The sign "less than" is to be so taken that
+
| align="center" | <math>\mathrm{f} ~-\!\!\!< \mathrm{m}</math>
 +
|-
 
|
 
|
| f < m
+
<p>means &ldquo;every Frenchman is a man&rdquo;, without saying whether there are any other men or not.  So,</p>
 +
|-
 +
| align="center" | <math>\mathit{m} ~-\!\!\!< \mathit{l}</math>
 +
|-
 
|
 
|
| means that every Frenchman is a man, but there are men besides Frenchmen.
+
<p>will mean that every mother of anything is a lover of the same thing;  although this interpretation in some degree anticipates a convention to be made further onThese significations of <math>=\!</math> and <math><\!</math> plainly conform to the indispensable conditions.  Upon the transitive character of these relations the syllogism depends, for by virtue of it, from</p>
| Drobisch has used this sign in the same senseIt will follow from these
+
|-
| significations of '=' and '<' that the sign '-<' (or '=<', "as small as")
 
| will mean "is".  Thus,
 
 
|
 
|
| f -< m
+
{| width="100%"
 +
| width="25%" | &nbsp;
 +
| align="center" | <math>\mathrm{f} ~-\!\!\!< \mathrm{m}</math>
 +
| width="25%" | &nbsp;
 +
|-
 +
| <p>and</p>
 +
| align="center" | <math>\mathrm{m} ~-\!\!\!< \mathrm{a}</math>
 +
| &nbsp;
 +
|-
 +
| <p>we can infer that</p>
 +
| align="center" | <math>\mathrm{f} ~-\!\!\!< \mathrm{a}</math>
 +
| &nbsp;
 +
|}
 +
|-
 
|
 
|
| means "every Frenchman is a man", without saying whether there are any
+
<p>that is, from every Frenchman being a man and every man being an animal, that every Frenchman is an animal.</p>
| other men or not.  So,
+
 
|
+
<p>But not only do the significations of <math>=\!</math> and <math><\!</math> here adopted fulfill all absolute requirements, but they have the supererogatory virtue of being very nearly the same as the common significations.  Equality is, in fact, nothing but the identity of two numbers;  numbers that are equal are those which are predicable of the same collections, just as terms that are identical are those which are predicable of the same classes.  So, to write <math>5 < 7\!</math> is to say that <math>5\!</math> is part of <math>7\!</math>, just as to write <math>\mathrm{f} < \mathrm{m}~\!</math> is to say that Frenchmen are part of men. Indeed, if <math>\mathrm{f} < \mathrm{m}~\!</math>, then the number of Frenchmen is less than the number of men, and if <math>\mathrm{v} = \mathrm{p}\!</math>, then the number of Vice-Presidents is equal to the number of Presidents of the Senate;  so that the numbers may always be substituted for the terms themselves, in case no signs of operation occur in the equations or inequalities.</p>
| 'm' -< 'l'
+
 
|
+
<p>(Peirce, CP 3.66).</p>
| will mean that every mother of anything is a lover of the same thing;
+
|}
| although this interpretation in some degree anticipates a convention to
 
| be made further on.  These significations of '=' and '<' plainly conform
 
| to the indispensable conditions.  Upon the transitive character of these
 
| relations the syllogism depends, for by virtue of it, from
 
|
 
| f -< m
 
|
 
| and
 
|
 
| m -< a,
 
|
 
| we can infer that
 
|
 
| f -< a;
 
|
 
| that is, from every Frenchman being a man and every
 
| man being an animal, that every Frenchman is an animal.
 
|
 
| But not only do the significations of '=' and '<' here adopted fulfill all
 
| absolute requirements, but they have the supererogatory virtue of being very
 
| nearly the same as the common significations.  Equality is, in fact, nothing
 
| but the identity of two numbers;  numbers that are equal are those which are
 
| predicable of the same collections, just as terms that are identical are those
 
| which are predicable of the same classes.  So, to write 5 < 7 is to say that 5
 
| is part of 7, just as to write f < m is to say that Frenchmen are part of men.
 
| Indeed, if f < m, then the number of Frenchmen is less than the number of men,
 
| and if v = p, then the number of Vice-Presidents is equal to the number of
 
| Presidents of the Senate;  so that the numbers may always be substituted
 
| for the terms themselves, in case no signs of operation occur in the
 
| equations or inequalities.
 
|
 
| C.S. Peirce, CP 3.66
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
</pre>
 
==Commentary Note 3==
 
  
<pre>
+
The quantifier mapping from terms to their numbers that Peirce signifies by means of the square bracket notation <math>[t]\!</math> has one of its principal uses in providing a basis for the computation of frequencies, probabilities, and all of the other statistical measures that can be constructed from these, and thus in affording what may be called a ''principle of correspondence'' between probability theory and its limiting case in the forms of logic.
The quantifier mapping from terms to their numbers that Peirce signifies
 
by means of the square bracket notation has one of its principal uses in
 
providing a basis for the computation of frequencies, probabilities, and
 
all of the other statistical measures that can be constructed from these,
 
and thus in affording what may be called a "principle of correspondence"
 
between probability theory and its limiting case in the forms of logic.
 
  
This brings us once again to the relativity of contingency and necessity,
+
This brings us once again to the relativity of contingency and necessity, as one way of approaching necessity is through the avenue of probability, describing necessity as a probability of 1, but the whole apparatus of probability theory only figures in if it is cast against the backdrop of probability space axioms, the reference class of distributions, and the sample space that we cannot help but to abduce upon the scene of observations.  Aye, there's the snake eyes.  And with them we can see that there is always an irreducible quantum of facticity to all our necessities.  More plainly spoken, it takes a fairly complex conceptual infrastructure just to begin speaking of probabilities, and this setting can only be set up by means of abductive, fallible, hypothetical, and inherently risky mental acts.
as one way of approaching necessity is through the avenue of probability,
 
describing necessity as a probability of 1, but the whole apparatus of
 
probability theory only figures in if it is cast against the backdrop
 
of probability space axioms, the reference class of distributions,
 
and the sample space that we cannot help but to abdeuce upon the
 
scene of observations.  Aye, there's the snake eyes.  And with
 
them we can see that there is always an irreducible quantum
 
of facticity to all our necessities.  More plainly spoken,
 
it takes a fairly complex conceptual infrastructure just
 
to begin speaking of probabilities, and this setting
 
can only be set up by means of abductive, fallible,
 
hypothetical, and inherently risky mental acts.
 
  
Pragmatic thinking is the logic of abduction, which is just another
+
Pragmatic thinking is the logic of abduction, which is just another way of saying that it addresses the question:  &ldquo;What may be hoped?&rdquo;  We have to face the possibility that it may be just as impossible to speak of &ldquo;absolute identity&rdquo; with any hope of making practical philosophical sense as it is to speak of &ldquo;absolute simultaneity&rdquo; with any hope of making operational physical sense.
way of saying that it addresses the question:  "What may be hoped?"
 
We have to face the possibility that it may be just as impossible
 
to speak of "absolute identity" with any hope of making practical
 
philosophical sense as it is to speak of "absolute simultaneity"
 
with any hope of making operational physical sense.
 
</pre>
 
  
 
==Selection 4==
 
==Selection 4==
  
<pre>
+
===The Signs for Addition===
| The Signs for Addition
+
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| The sign of addition is taken by Boole so that
+
<p>The sign of addition is taken by Boole so that</p>
 +
|-
 +
| align="center" | <math>x + y\!</math>
 +
|-
 
|
 
|
| x + y
+
<p>denotes everything denoted by <math>x\!</math>, and, ''besides'', everything denoted by <math>y\!</math>.</p>
 +
 
 +
<p>Thus</p>
 +
|-
 +
| align="center" | <math>\mathrm{m} + \mathrm{w}~\!</math>
 +
|-
 
|
 
|
| denotes everything denoted by x, and, 'besides',
+
<p>denotes all men, and, besides, all women.</p>
| everything denoted by y.
+
 
 +
<p>This signification for this sign is needed for connecting the notation of logic with that of the theory of probabilities.  But if there is anything which is denoted by both terms of the sum, the latter no longer stands for any logical term on account of its implying that the objects denoted by one term are to be taken ''besides'' the objects denoted by the other.</p>
 +
 
 +
<p>For example,</p>
 +
|-
 +
| align="center" | <math>\mathrm{f} + \mathrm{u}\!</math>
 +
|-
 
|
 
|
| Thus
+
<p>means all Frenchmen besides all violinists, and, therefore, considered as a logical term, implies that all French violinists are ''besides themselves''.</p>
 +
 
 +
<p>For this reason alone, in a paper which is published in the Proceedings of the Academy for March 17, 1867, I preferred to take as the regular addition of logic a non-invertible process, such that</p>
 +
|-
 +
| align="center" | <math>\mathrm{m} ~+\!\!,~ \mathrm{b}</math>
 +
|-
 
|
 
|
| m + w
+
<p>stands for all men and black things, without any implication that the black things are to be taken besides the men;  and the study of the logic of relatives has supplied me with other weighty reasons for the same determination.</p>
|
+
 
| denotes all men, and, besides, all women.
+
<p>Since the publication of that paper, I have found that Mr.&nbsp;W.&nbsp;Stanley&nbsp;Jevons, in a tract called ''Pure Logic, or the Logic of Quality'' [1864], had anticipated me in substituting the same operation for Boole's addition, although he rejects Boole's operation entirely and writes the new one with a &nbsp;<math>+\!</math>&nbsp; sign while withholding from it the name of addition.</p>
|
+
 
| This signification for this sign is needed for
+
<p>It is plain that both the regular non-invertible addition and the invertible addition satisfy the absolute conditions.  But the notation has other recommendations.  The conception of ''taking together'' involved in these processes is strongly analogous to that of summation, the sum of 2 and 5, for example, being the number of a collection which consists of a collection of two and a collection of five.  Any logical equation or inequality in which no operation but addition is involved may be converted into a numerical equation or inequality by substituting the numbers of the several terms for the terms themselves &mdash; provided all the terms summed are mutually exclusive.</p>
| connecting the notation of logic with that of the
+
 
| theory of probabilities.  But if there is anything
+
<p>Addition being taken in this sense, ''nothing'' is to be denoted by ''zero'', for then</p>
| which is denoted by both terms of the sum, the latter
+
|-
| no longer stands for any logical term on account of
+
| align="center" | <math>x ~+\!\!,~ 0 ~=~ x</math>
| its implying that the objects denoted by one term
+
|-
| are to be taken 'besides' the objects denoted by
 
| the other.
 
|
 
| For example,
 
|
 
| f + u
 
|
 
| means all Frenchmen besides all violinists, and,
 
| therefore, considered as a logical term, implies
 
| that all French violinists are 'besides themselves'.
 
|
 
| For this reason alone, in a paper which is published
 
| in the Proceedings of the Academy for March 17, 1867,
 
| I preferred to take as the regular addition of logic
 
| a non-invertible process, such that
 
|
 
| m +, b
 
|
 
| stands for all men and black things, without any implication that
 
| the black things are to be taken besides the men;  and the study of
 
| the logic of relatives has supplied me with other weighty reasons for
 
| the same determination.
 
|
 
| Since the publication of that paper, I have found that Mr. W. Stanley Jevons, in
 
| a tract called 'Pure Logic, or the Logic of Quality' [1864], had anticipated me in
 
| substituting the same operation for Boole's addition, although he rejects Boole's
 
| operation entirely and writes the new one with a '+' sign while withholding from
 
| it the name of addition.
 
 
|
 
|
| It is plain that both the regular non-invertible addition
+
<p>whatever is denoted by <math>x\!</math>;  and this is the definition of ''zero''.  This interpretation is given by Boole, and is very neat, on account of the resemblance between the ordinary conception of ''zero'' and that of nothing, and because we shall thus have</p>
| and the invertible addition satisfy the absolute conditions.
+
|-
| But the notation has other recommendations.  The conception
+
| align="center" | <math>[0] ~=~ 0.</math>
| of 'taking together' involved in these processes is strongly
+
|-
| analogous to that of summation, the sum of 2 and 5, for example,
 
| being the number of a collection which consists of a collection of
 
| two and a collection of five. Any logical equation or inequality
 
| in which no operation but addition is involved may be converted
 
| into a numerical equation or inequality by substituting the
 
| numbers of the several terms for the terms themselves --
 
| provided all the terms summed are mutually exclusive.
 
 
|
 
|
| Addition being taken in this sense,
+
<p>(Peirce, CP 3.67).</p>
| 'nothing' is to be denoted by 'zero',
+
|}
| for then
 
|
 
| x +, 0 = x,
 
|
 
| whatever is denoted by x;  and this is the definition
 
| of 'zero'.  This interpretation is given by Boole, and
 
| is very neat, on account of the resemblance between the
 
| ordinary conception of 'zero' and that of nothing, and
 
| because we shall thus have
 
|
 
| [0] = 0.
 
|
 
| C.S. Peirce, CP 3.67
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
</pre>
 
  
==Commentary Note 4==
+
A wealth of issues arises here that I hope to take up in depth at a later point, but for the moment I shall be able to mention only the barest sample of them in passing.
  
<pre>
+
The two papers that precede this one in CP&nbsp;3 are Peirce's papers of March and September 1867 in the ''Proceedings of the American Academy of Arts and Sciences'', titled &ldquo;On an Improvement in Boole's Calculus of Logic&rdquo; and &ldquo;Upon the Logic of Mathematics&rdquo;, respectively.  Among other things, these two papers provide us with further clues about the motivating considerations that brought Peirce to introduce the &ldquo;number of a term&rdquo; function, signified here by square brackets.  I have already quoted from the &ldquo;Logic of Mathematics&rdquo; paper in a related connection. Here are the links to those excerpts:
A wealth of issues arise here that I hope
 
to take up in depth at a later point, but
 
for the moment I shall be able to mention
 
only the barest sample of them in passing.
 
  
The two papers that precede this one in CP 3 are Peirce's papers of
+
<dl style="margin-left:30px;">
March and September 1867 in the 'Proceedings of the American Academy
+
<dt>Limited Mark Universes
of Arts and Sciences', titled "On an Improvement in Boole's Calculus
+
<dd>[http://web.archive.org/web/20140429004255/http://suo.ieee.org/ontology/msg04349.html (1)]
of Logic" and "Upon the Logic of Mathematics", respectively.  Among
+
<dd>[http://web.archive.org/web/20140429004359/http://suo.ieee.org/ontology/msg04350.html (2)]
other things, these two papers provide us with further clues about
+
<dd>[http://web.archive.org/web/20140429004130/http://suo.ieee.org/ontology/msg04351.html (3)]
the motivating considerations that brought Peirce to introduce the
+
</dl>
"number of a term" function, signified here by square brackets.
 
I have already quoted from the "Logic of Mathematics" paper in
 
a related connection. Here are the links to those excerpts:
 
  
http://suo.ieee.org/ontology/msg04350.html
+
In setting up a correspondence between &ldquo;letters&rdquo; and &ldquo;numbers&rdquo;, Peirce constructs a structure-preserving map from a logical domain to a numerical domain. That he does this deliberately is evidenced by the care that he takes with the conditions under which the chosen aspects of structure are preserved, along with his recognition of the critical fact that zeroes are preserved by the mapping.
http://suo.ieee.org/ontology/msg04351.html
 
  
In setting up a correspondence between "letters" and "numbers",
+
Incidentally, Peirce appears to have an inkling of the problems that would later be caused by using the plus sign for inclusive disjunction, but his advice was overridden by the dialects of applied logic that developed in various communities, retarding the exchange of information among engineering, mathematical, and philosophical specialties all throughout the subsequent century.
my sense is that Peirce is "nocking an arrow", or constructing
 
some kind of structure-preserving map from a logical domain to
 
a numerical domain, and this interpretation is here reinforced
 
by the careful attention that he gives to the conditions under
 
which precisely which aspects of structure are preserved, plus
 
his telling recognition of the criterial fact that zeroes are
 
preserved by the mapping.  But here's the catch, the arrow is
 
from the qualitative domain to the quantitative domain, which
 
is just the opposite of what I tend to expect, since I think
 
of quantitative measures as preserving more information than
 
qualitative measures.  To curtail the story, it is possible
 
to sort this all out, but that is a story for another day.
 
  
Other than that, I just want to red flag the beginnings
+
==Selection 5==
of another one of those "failures to communicate" that
 
so dogged the disciplines in the 20th Century, namely,
 
the fact that Peirce seemed to have an inkling about
 
the problems that would be caused by using the plus
 
sign for inclusive disjunction, but, as it happens,
 
his advice was overridden by the usages in various
 
different communities, rendering the exchange of
 
information among engineering, mathematical, and
 
philosophical specialties a minefield in place
 
of mindfield to this very day.
 
</pre>
 
  
==Selection 5==
+
===The Signs for Multiplication===
  
<pre>
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
| The Signs for Multiplication
 
 
|
 
|
| I shall adopt for the conception of multiplication
+
<p>I shall adopt for the conception of multiplication ''the application of a relation'', in such a way that, for example, <math>\mathit{l}\mathrm{w}~\!</math> shall denote whatever is lover of a woman.  This notation is the same as that used by Mr.&nbsp;De&nbsp;Morgan, although he appears not to have had multiplication in his mind.</p>
| 'the application of a relation', in such a way that,
+
 
| for example, 'l'w shall denote whatever is lover of
+
<p><math>\mathit{s}(\mathrm{m} ~+\!\!,~ \mathrm{w})</math> will, then, denote whatever is servant of anything of the class composed of men and women taken together.  So that:</p>
| a woman.  This notation is the same as that used by
+
|-
| Mr. De Morgan, although he apears not to have had
+
| align="center" | <math>\mathit{s}(\mathrm{m} ~+\!\!,~ \mathrm{w}) ~=~ \mathit{s}\mathrm{m} ~+\!\!,~ \mathit{s}\mathrm{w}.</math>
| multiplication in his mind.
+
|-
 
|
 
|
| 's'(m +, w) will, then, denote whatever is
+
<p><math>(\mathit{l} ~+\!\!,~ \mathit{s})\mathrm{w}</math> will denote whatever is lover or servant to a woman, and:</p>
| servant of anything of the class composed
+
|-
| of men and women taken together. So that:
+
| align="center" | <math>(\mathit{l} ~+\!\!,~ \mathit{s})\mathrm{w} ~=~ \mathit{l}\mathrm{w} ~+\!\!,~ \mathit{s}\mathrm{w}.</math>
 +
|-
 
|
 
|
| 's'(m +, w= 's'm +, 's'w.
+
<p><math>(\mathit{s}\mathit{l})\mathrm{w}\!</math> will denote whatever stands to a woman in the relation of servant of a lover, and:</p>
 +
|-
 +
| align="center" | <math>(\mathit{s}\mathit{l})\mathrm{w} ~=~ \mathit{s}(\mathit{l}\mathrm{w}).</math>
 +
|-
 
|
 
|
| ('l' +, 's')w will denote whatever is
+
<p>Thus all the absolute conditions of multiplication are satisfied.</p>
| lover or servant to a woman, and:
+
 
 +
<p>The term &ldquo;identical with&nbsp;&mdash;&mdash;&rdquo; is a unity for this multiplication.  That is to say, if we denote &ldquo;identical with&nbsp;&mdash;&mdash;&rdquo; by <math>\mathit{1}\!</math> we have:</p>
 +
|-
 +
| align="center" | <math>x \mathit{1} ~=~ x ~ ,</math>
 +
|-
 
|
 
|
| ('l' +, 's')w  =  'l'w +, 's'w.
+
<p>whatever relative term <math>x\!</math> may be. For what is a lover of something identical with anything, is the same as a lover of that thing.</p>
|
 
| ('sl')w will denote whatever stands to
 
| a woman in the relation of servant of
 
| a lover, and:
 
|
 
| ('sl')w  =  's'('l'w).
 
|
 
| Thus all the absolute conditions
 
| of multiplication are satisfied.
 
|
 
| The term "identical with ---" is a unity
 
| for this multiplication.  That is to say,
 
| if we denote "identical with ---" by !1!
 
| we have:
 
|
 
| 'x'!1!  =  'x',
 
|
 
| whatever relative term 'x' may be.
 
| For what is a lover of something
 
| identical with anything, is the
 
| same as a lover of that thing.
 
|
 
| C.S. Peirce, CP 3.68
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
</pre>
 
  
==Commentary Note 5==
+
<p>(Peirce, CP 3.68).</p>
 +
|}
  
<pre>
+
Peirce in 1870 is five years down the road from the Peirce of 1865&ndash;1866 who lectured extensively on the role of sign relations in the logic of scientific inquiry, articulating their involvement in the three types of inference, and inventing the concept of &ldquo;information&rdquo; to explain what it is that signs convey in the process.  By this time, then, the semiotic or sign relational approach to logic is so implicit in his way of working that he does not always take the trouble to point out its distinctive features at each and every turn. So let's take a moment to draw out a few of these characters.
Peirce in 1870 is five years down the road from the Peirce of 1865-1866
 
who lectured extensively on the role of sign relations in the logic of
 
scientific inquiry, articulating their involvement in the three types
 
of inference, and inventing the concept of "information" to explain
 
what it is that signs convey in the process.  By this time, then,
 
the semiotic or sign relational approach to logic is so implicit
 
in his way of working that he does not always take the trouble
 
to point out its distinctive features at each and every turn.
 
So let's take a moment to draw out a few of these characters.
 
  
Sign relations, like any non-trivial brand of 3-adic relations,
+
[[Sign relations]], like any brand of non-trivial [[3-adic relations]], can become overwhelming to think about once the cardinality of the object, sign, and interpretant domains or the complexity of the relation itself ascends beyond the simplest examples. Furthermore, most of the strategies that we would normally use to control the complexity, like neglecting one of the domains, in effect, projecting the 3-adic sign relation onto one of its 2-adic faces, or focusing on a single ordered triple of the form <math>(o, s, i)\!</math> at a time, can result in our receiving a distorted impression of the sign relation's true nature and structure.
can become overwhelming to think about once the cardinality of
 
the object, sign, and interpretant domains or the complexity
 
of the relation itself ascends beyond the simplest examples.
 
Furthermore, most of the strategies that we would normally
 
use to control the complexity, like neglecting one of the
 
domains, in effect, projecting the 3-adic sign relation
 
onto one of its 2-adic faces, or focusing on a single
 
ordered triple of the form <o, s, i> at a time, can
 
result in our receiving a distorted impression of
 
the sign relation's true nature and structure.
 
  
I find that it helps me to draw, or at least to imagine drawing,
+
I find that it helps me to draw, or at least to imagine drawing, diagrams of the following form, where I can keep tabs on what's an object, what's a sign, and what's an interpretant sign, for a selected set of sign-relational triples.
diagrams of the following form, where I can keep tabs on what's
 
an object, what's a sign, and what's an interpretant sign, for
 
a selected set of sign-relational triples.
 
  
Here is how I would picture Peirce's example of equivalent terms:
+
Here is how I would picture Peirce's example of equivalent terms, <math>\mathrm{v} = \mathrm{p},\!</math> where <math>{}^{\backprime\backprime} \mathrm{v} {}^{\prime\prime}\!</math> denotes the Vice-President of the United States, and <math>{}^{\backprime\backprime} \mathrm{p} {}^{\prime\prime}\!</math> denotes the President of the Senate of the United States.
v = p, where "v" denotes the Vice-President of the United States,
 
and "p" denotes the President of the Senate of the United States.
 
  
o-----------------------------o-----------------------------o
+
{| align="center" border="0" cellspacing="10" style="text-align:center; width:100%"
| Objective Framework (OF)  | Interpretive Framework (IF) |
+
| [[Image:LOR 1870 Figure 1.jpg]]
o-----------------------------o-----------------------------o
+
|-
|          Objects          |            Signs            |
+
| height="20px" valign="top" | <math>\text{Figure 1}~\!</math>
o-----------------------------o-----------------------------o
+
|}
|                                                           |
 
|                                o "v"                     |
 
|                                /                          |
 
|                              /                          |
 
|                              /                            |
 
|          o ... o-----------@                            |
 
|                              \                           |
 
|                              \                           |
 
|                               \                          |
 
|                                o "p"                    |
 
|                                                          |
 
o-----------------------------o-----------------------------o
 
  
Depending on whether we interpret the terms "v" and "p" as applying to
+
Depending on whether we interpret the terms <math>{}^{\backprime\backprime} \mathrm{v} {}^{\prime\prime}\!</math> and <math>{}^{\backprime\backprime} \mathrm{p} {}^{\prime\prime}\!</math> as applying to persons who hold these offices at one particular time or as applying to all those persons who have held these offices over an extended period of history, their denotations may be either singular of plural, respectively.
persons who hold these offices at one particular time or as applying to
 
all those persons who have held these offices over an extended period of
 
history, their denotations may be either singular of plural, respectively.
 
  
As a shortcut technique for indicating general denotations or plural referents,
+
As a shortcut technique for indicating general denotations or plural referents, I will use the ''elliptic convention'' that represents these by means of figures like &ldquo;o&nbsp;o&nbsp;o&rdquo; or &ldquo;o&nbsp;&hellip;&nbsp;o&rdquo;, placed at the object ends of sign relational triads.
I will use the "elliptic convention" that represents these by means of figures
 
like "o o o" or "o ... o", placed at the object ends of sign relational triads.
 
  
For a more complex example, here is how I would picture Peirce's example
+
For a more complex example, here is how I would picture Peirce's example of an equivalence between terms that comes about by applying one of the distributive laws, for relative multiplication over absolute summation.
of an equivalence between terms that comes about by applying one of the
 
distributive laws, for relative multiplication over absolute summation.
 
  
o-----------------------------o-----------------------------o
+
{| align="center" border="0" cellspacing="10" style="text-align:center; width:100%"
| Objective Framework (OF)  | Interpretive Framework (IF) |
+
| [[Image:LOR 1870 Figure 2.jpg]]
o-----------------------------o-----------------------------o
+
|-
|           Objects          |            Signs            |
+
| height="20px" valign="top" | <math>\text{Figure 2}\!</math>
o-----------------------------o-----------------------------o
+
|}
|                                                           |
 
|                                o "'s'(m +, w)"           |
 
|                                /                          |
 
|                              /                          |
 
|                              /                            |
 
|          o ... o-----------@                            |
 
|                              \                            |
 
|                              \                           |
 
|                                \                         |
 
|                                o "'s'm +, 's'w"          |
 
|                                                          |
 
o-----------------------------o-----------------------------o
 
</pre>
 
  
 
==Selection 6==
 
==Selection 6==
  
<pre>
+
===The Signs for Multiplication (cont.)===
| The Signs for Multiplication (cont.)
+
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| A conjugative term like 'giver' naturally requires two correlates,
+
<p>A conjugative term like ''giver'' naturally requires two correlates, one denoting the thing given, the other the recipient of the gift.</p>
| one denoting the thing given, the other the recipient of the gift.
+
 
 +
<p>We must be able to distinguish, in our notation, the giver of <math>\mathrm{A}\!</math> to <math>\mathrm{B}\!</math> from the giver to <math>\mathrm{A}\!</math> of <math>\mathrm{B}\!</math>, and, therefore, I suppose the signification of the letter equivalent to such a relative to distinguish the correlates as first, second, third, etc., so that &ldquo;giver of&nbsp;&mdash;&mdash; to&nbsp;&mdash;&mdash;&rdquo; and &ldquo;giver to&nbsp;&mdash;&mdash; of&nbsp;&mdash;&mdash;&rdquo; will be expressed by different letters.</p>
 +
 
 +
<p>Let <math>\mathfrak{g}</math> denote the latter of these conjugative terms.  Then, the correlates or multiplicands of this multiplier cannot all stand directly after it, as is usual in multiplication, but may be ranged after it in regular order, so that:</p>
 +
|-
 +
| align="center" | <math>\mathfrak{g}\mathit{x}\mathit{y}</math>
 +
|-
 
|
 
|
| We must be able to distinguish, in our notation, the
+
<p>will denote a giver to <math>\mathit{x}\!</math> of <math>\mathit{y}\!</math>.</p>
| giver of A to B from the giver to A of B, and, therefore,
+
 
| I suppose the signification of the letter equivalent to such
+
<p>But according to the notation, <math>\mathit{x}\!</math> here multiplies <math>\mathit{y}\!</math>, so that if we put for <math>\mathit{x}\!</math> owner (<math>\mathit{o}\!</math>), and for <math>\mathit{y}\!</math> horse (<math>\mathrm{h}\!</math>),</p>
| a relative to distinguish the correlates as first, second, third,
+
|-
| etc., so that "giver of --- to ---" and "giver to --- of ---" will
+
| align="center" | <math>\mathfrak{g}\mathit{o}\mathrm{h}</math>
| be expressed by different letters.
+
|-
 
|
 
|
| Let `g` denote the latter of these conjugative terms.  Then, the correlates
+
<p>appears to denote the giver of a horse to an owner of a horseBut let the individual horses be <math>\mathrm{H}, \mathrm{H}^{\prime}, \mathrm{H}^{\prime\prime}</math>, etc.</p>
| or multiplicands of this multiplier cannot all stand directly after it, as is
+
 
| usual in multiplication, but may be ranged after it in regular order, so that:
+
<p>Then:</p>
 +
|-
 +
| align="center" | <math>\mathrm{h} ~=~ \mathrm{H} ~+\!\!,~ \mathrm{H}^{\prime} ~+\!\!,~ \mathrm{H}^{\prime\prime} ~+\!\!,~ \text{etc.}</math>
 +
|-
 +
| align="center" | <math>\mathfrak{g}\mathit{o}\mathrm{h} ~=~ \mathfrak{g}\mathit{o}(\mathrm{H} ~+\!\!,~ \mathrm{H}^{\prime} ~+\!\!,~ \mathrm{H}^{\prime\prime} ~+\!\!,~ \text{etc.}) ~=~ \mathfrak{g}\mathit{o}\mathrm{H} ~+\!\!,~ \mathfrak{g}\mathit{o}\mathrm{H}^{\prime} ~+\!\!,~ \mathfrak{g}\mathit{o}\mathrm{H}^{\prime\prime} ~+\!\!,~ \text{etc.}</math>
 +
|-
 
|
 
|
| `g`xy
+
<p>Now this last member must be interpreted as a giver of a horse to the owner of ''that'' horse, and this, therefore must be the interpretation of <math>\mathfrak{g}\mathit{o}\mathrm{h}</math>.  This is always very important.  ''A term multiplied by two relatives shows that the same individual is in the two relations.''</p>
 +
 
 +
<p>If we attempt to express the giver of a horse to a lover of a woman, and for that purpose write:</p>
 +
|-
 +
| align="center" | <math>\mathfrak{g}\mathit{l}\mathrm{w}\mathrm{h}</math>,
 +
|-
 
|
 
|
| will denote a giver to x of y.
+
<p>we have written giver of a woman to a lover of her, and if we add brackets, thus,</p>
 +
|-
 +
| align="center" | <math>\mathfrak{g}(\mathit{l}\mathrm{w})\mathrm{h}</math>,
 +
|-
 
|
 
|
| But according to the notation,
+
<p>we abandon the associative principle of multiplication.</p>
| x here multiplies y, so that
+
 
| if we put for x owner ('o'),
+
<p>A little reflection will show that the associative principle must in some form or other be abandoned at this point.  But while this principle is sometimes falsified, it oftener holds, and a notation must be adopted which will show of itself when it holds.  We already see that we cannot express multiplication by writing the multiplicand directly after the multiplier;  let us then affix subjacent numbers after letters to show where their correlates are to be found.  The first number shall denote how many factors must be counted from left to right to reach the first correlate, the second how many ''more'' must be counted to reach the second, and so on.</p>
| and for y horse (h),
+
 
 +
<p>Then, the giver of a horse to a lover of a woman may be written:</p>
 +
|-
 +
| align="center" | <math>\mathfrak{g}_{12} \mathit{l}_1 \mathrm{w} \mathrm{h} ~=~ \mathfrak{g}_{11} \mathit{l}_2 \mathrm{h} \mathrm{w} ~=~ \mathfrak{g}_{2(-1)} \mathrm{h} \mathit{l}_1 \mathrm{w}</math>.
 +
|-
 
|
 
|
| `g`'o'h
+
<p>Of course a negative number indicates that the former correlate follows the latter by the corresponding positive number.</p>
 +
 
 +
<p>A subjacent ''zero'' makes the term itself the correlate.</p>
 +
 
 +
<p>Thus,</p>
 +
|-
 +
| align="center" | <math>\mathit{l}_0\!</math>
 +
|-
 
|
 
|
| appears to denote the giver of a horse
+
<p>denotes the lover of ''that'' lover or the lover of himself, just as <math>\mathfrak{g}\mathit{o}\mathrm{h}</math> denotes that the horse is given to the owner of itself, for to make a term doubly a correlate is, by the distributive principle, to make each individual doubly a correlate, so that:</p>
| to an owner of a horse.  But let the
+
|-
| individual horses be H, H', H", etc.
+
| align="center" | <math>\mathit{l}_0 ~=~ \mathit{L}_0 ~+\!\!,~ \mathit{L}_0^{\prime} ~+\!\!,~ \mathit{L}_0^{\prime\prime} ~+\!\!,~ \text{etc.}</math>
 +
|-
 
|
 
|
| Then:
+
<p>A subjacent sign of infinity may indicate that the correlate is indeterminate, so that:</p>
 +
|-
 +
| align="center" | <math>\mathit{l}_\infty</math>
 +
|-
 
|
 
|
| = H +, H' +, H" +, etc.
+
<p>will denote a lover of something.  We shall have some confirmation of this presently.</p>
 +
 
 +
<p>If the last subjacent number is a ''one'' it may be omitted.  Thus we shall have:</p>
 +
|-
 +
| align="center" | <math>\mathit{l}_1 ~=~ \mathit{l}</math>,
 +
|-
 +
| align="center" | <math>\mathfrak{g}_{11} ~=~ \mathfrak{g}_1 ~=~ \mathfrak{g}</math>.
 +
|-
 
|
 
|
| `g`'o'h `g`'o'(H +, H' +, H" +, etc.)
+
<p>This enables us to retain our former expressions <math>\mathit{l}\mathrm{w}~\!</math>, <math>\mathfrak{g}\mathit{o}\mathrm{h}</math>, etc.</p>
 +
 
 +
<p>(Peirce, CP 3.69&ndash;70).</p>
 +
|}
 +
 
 +
===Comment : Sets as Logical Sums===
 +
 
 +
Peirce's way of representing sets as logical sums may seem archaic, but it is quite often used, and is actually the tool of choice in many branches of algebra, combinatorics, computing, and statistics to this very day.
 +
 
 +
Peirce's application to logic is fairly novel, and the degree of his elaboration of the logic of relative terms is certainly original with him, but this particular genre of representation, commonly going under the handle of ''generating functions'', goes way back, well before anyone thought to stick a flag in set theory as a separate territory or to try to fence off our native possessions of it with expressly decreed axioms. And back in the days when a computer was just a person who computed, before we had the sorts of ''electronic register machines'' that we take so much for granted today, mathematicians were constantly using generating functions as a rough and ready type of addressable memory to sort, store, and keep track of their accounts of a wide variety of formal objects of thought.
 +
 
 +
Let us look at a few simple examples of generating functions, much as I encountered them during my own first adventures in the Fair Land Of Combinatoria.
 +
 
 +
Suppose that we are given a set of three elements, say, <math>\{ a, b, c \},\!</math> and we are asked to find all the ways of choosing a subset from this collection.
 +
 
 +
We can represent this problem setup as the problem of computing the following product:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 +
| <math>(1 + a)(1 + b)(1 + c).\!</math>
 +
|}
 +
 
 +
The factor <math>(1 + a)\!</math> represents the option that we have, in choosing a subset of <math>\{ a, b, c \},\!</math> to leave the element <math>a\!</math> out (signified by the <math>1\!</math>), or else to include it (signified by the <math>a\!</math>), and likewise for the other elements <math>b\!</math> and <math>c\!</math> in their turns.
 +
 
 +
Probably on account of all those years I flippered away playing the oldtime pinball machines, I tend to imagine a product like this being displayed in a vertical array:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
|         =  `g`'o'H +, `g`'o'H' +, `g`'o'H" +, etc.
+
<math>\begin{matrix}
 +
(1 ~+~ a)
 +
\\
 +
(1 ~+~ b)
 +
\\
 +
(1 ~+~ c)
 +
\end{matrix}</math>
 +
|}
 +
 
 +
I picture this as a playboard with six bumpers, the ball chuting down the board in such a career that it strikes exactly one of the two bumpers on each and every one of the three levels.
 +
 
 +
So a trajectory of the ball where it hits the <math>a\!</math> bumper on the 1st level, hits the <math>1\!</math> bumper on the 2nd level, hits the <math>c\!</math> bumper on the 3rd level, and then exits the board, represents a single term in the desired product and corresponds to the subset <math>\{ a, c \}.\!</math>
 +
 
 +
Multiplying out the product <math>(1 + a)(1 + b)(1 + c),\!</math> one obtains:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| Now this last member must be interpreted as a giver
+
<math>\begin{array}{*{15}{c}}
| of a horse to the owner of 'that' horse, and this,
+
1 & + & a & + & b & + & c & + & ab & + & ac & + & bc & + & abc.
| therefore must be the interpretation of `g`'o'h.
+
\end{array}</math>
 +
|}
 +
 
 +
And this informs us that the subsets of choice are:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| This is always very important.
+
<math>\begin{matrix}
 +
\varnothing, & \{ a \}, & \{ b \}, & \{ c \}, & \{ a, b \}, & \{ a, c \}, & \{ b, c \}, & \{ a, b, c \}.
 +
\end{matrix}</math>
 +
|}
 +
 
 +
==Selection 7==
 +
 
 +
===The Signs for Multiplication (cont.)===
 +
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| 'A term multiplied by two relatives shows that
+
<p>The associative principle does not hold in this counting of factors.  Because it does not hold, these subjacent numbers are frequently inconvenient in practice, and I therefore use also another mode of showing where the correlate of a term is to be found.  This is by means of the marks of reference, <math>\dagger ~ \ddagger ~ \parallel ~ \S ~ \P</math>, which are placed subjacent to the relative term and before and above the correlate. Thus, giver of a horse to a lover of a woman may be written:</p>
the same individual is in the two relations.'
+
|-
 +
| align="center" | <math>\mathfrak{g}_{\dagger\ddagger} \, ^\dagger\mathit{l}_\parallel \, ^\parallel\mathrm{w} \, ^\ddagger\mathrm{h}</math>
 +
|-
 
|
 
|
| If we attempt to express the giver of a horse to
+
<p>The asterisk I use exclusively to refer to the last correlate of the last relative of the algebraic term.</p>
| a lover of a woman, and for that purpose write:
+
 
 +
<p>Now, considering the order of multiplication to be: &mdash; a term, a correlate of it, a correlate of that correlate, etc. &mdash; there is no violation of the associative principle.  The only violations of it in this mode of notation are that in thus passing from relative to correlate, we skip about among the factors in an irregular manner, and that we cannot substitute in such an expression as <math>\mathfrak{g}\mathit{o}\mathrm{h}</math> a single letter for <math>\mathit{o}\mathrm{h}.\!</math></p>
 +
 
 +
<p>I would suggest that such a notation may be found useful in treating other cases of non-associative multiplication.  By comparing this with what was said above [in CP 3.55] concerning functional multiplication, it appears that multiplication by a conjugative term is functional, and that the letter denoting such a term is a symbol of operation.  I am therefore using two alphabets, the Greek and Kennerly, where only one was necessary.  But it is convenient to use both.</p>
 +
 
 +
<p>(Peirce, CP 3.71&ndash;72).</p>
 +
|}
 +
 
 +
===Comment : Proto-Graphical Syntax===
 +
 
 +
It is clear from our last excerpt that Peirce is already on the verge of a graphical syntax for the logic of relatives.  Indeed, it seems likely that he had already reached this point in his own thinking.
 +
 
 +
For instance, it seems quite impossible to read his last variation on the theme of a &ldquo;giver of a horse to a lover of a woman&rdquo; without drawing lines of identity to connect up the corresponding marks of reference, like this:
 +
 
 +
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 3.jpg]] || (3)
 +
|}
 +
 
 +
==Selection 8==
 +
 
 +
===The Signs for Multiplication (cont.)===
 +
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| `g`'l'wh,
+
<p>Thus far, we have considered the multiplication of relative terms only.  Since our conception of multiplication is the application of a relation, we can only multiply absolute terms by considering them as relatives.</p>
 +
 
 +
<p>Now the absolute term &ldquo;man&rdquo; is really exactly equivalent to the relative term &ldquo;man that is&nbsp;&mdash;&mdash;&rdquo;, and so with any other.  I shall write a comma after any absolute term to show that it is so regarded as a relative term.</p>
 +
 
 +
<p>Then &ldquo;man that is black&rdquo; will be written:</p>
 +
|-
 +
| align="center" | <math>\mathrm{m},\!\mathrm{b}\!</math>
 +
|-
 
|
 
|
| we have written giver of a woman to a lover of her,
+
<p>But not only may any absolute term be thus regarded as a relative term, but any relative term may in the same way be regarded as a relative with one correlate more.  It is convenient to take this additional correlate as the first one.</p>
| and if we add brackets, thus,
+
 
 +
<p>Then:</p>
 +
|-
 +
| align="center" | <math>\mathit{l},\!\mathit{s}\mathrm{w}</math>
 +
|-
 
|
 
|
| `g`('l'w)h,
+
<p>will denote a lover of a woman that is a servant of that woman.</p>
 +
 
 +
<p>The comma here after <math>\mathit{l}\!</math> should not be considered as altering at all the meaning of <math>\mathit{l}\!</math>, but as only a subjacent sign, serving to alter the arrangement of the correlates.</p>
 +
 
 +
<p>In point of fact, since a comma may be added in this way to any relative term, it may be added to one of these very relatives formed by a comma, and thus by the addition of two commas an absolute term becomes a relative of two correlates.</p>
 +
 
 +
<p>So:</p>
 +
|-
 +
| align="center" | <math>\mathrm{m},\!,\!\mathrm{b},\!\mathrm{r}</math>
 +
|-
 
|
 
|
| we abandon the associative principle of multiplication.
+
<p>interpreted like</p>
 +
|-
 +
| align="center" | <math>\mathfrak{g}\mathit{o}\mathrm{h}</math>
 +
|-
 
|
 
|
| A little reflection will show that the associative principle must
+
<p>means a man that is a rich individual and is a black that is that rich individual.</p>
| in some form or other be abandoned at this point.  But while this
+
 
| principle is sometimes falsified, it oftener holds, and a notation
+
<p>But this has no other meaning than:</p>
| must be adopted which will show of itself when it holds. We already
+
|-
| see that we cannot express multiplication by writing the multiplicand
+
| align="center" | <math>\mathrm{m},\!\mathrm{b},\!\mathrm{r}</math>
| directly after the multiplier;  let us then affix subjacent numbers after
+
|-
| letters to show where their correlates are to be found.  The first number
 
| shall denote how many factors must be counted from left to right to reach
 
| the first correlate, the second how many 'more' must be counted to reach
 
| the second, and so on.
 
 
|
 
|
| Then, the giver of a horse to a lover of a woman may be written:
+
<p>or a man that is a black that is rich.</p>
|
+
 
| `g`_12 'l'_1 w = `g`_11 'l'_2 h w =  `g`_2(-1) h 'l'_1 w.
+
<p>Thus we see that, after one comma is added, the addition of another does not change the meaning at all, so that whatever has one comma after it must be regarded as having an infinite number.</p>
 +
 
 +
<p>If, therefore, <math>\mathit{l},\!,\!\mathit{s}\mathrm{w}</math> is not the same as <math>\mathit{l},\!\mathit{s}\mathrm{w}</math> (as it plainly is not, because the latter means a lover and servant of a woman, and the former a lover of and servant of and same as a woman), this is simply because the writing of the comma alters the arrangement of the correlates.</p>
 +
 
 +
<p>And if we are to suppose that absolute terms are multipliers at all (as mathematical generality demands that we should}, we must regard every term as being a relative requiring an infinite number of correlates to its virtual infinite series &ldquo;that is&nbsp;&mdash;&mdash; and is&nbsp;&mdash;&mdash; and is&nbsp;&mdash;&mdash; etc.&rdquo;</p>
 +
 
 +
<p>Now a relative formed by a comma of course receives its subjacent numbers like any relative, but the question is, What are to be the implied subjacent numbers for these implied correlates?</p>
 +
 
 +
<p>Any term may be regarded as having an infinite number of factors, those at the end being ''ones'', thus:</p>
 +
|-
 +
| align="center" | <math>\mathit{l},\!\mathit{s}\mathrm{w} ~=~ \mathit{l},\!\mathit{s}\mathit{w},\!\mathit{1},\!\mathit{1},\!\mathit{1},\!\mathit{1},\!\mathit{1},\!\mathit{1},\!\mathit{1}, ~\text{etc.}</math>
 +
|-
 
|
 
|
| Of course a negative number indicates that
+
<p>A subjacent number may therefore be as great as we please.</p>
| the former correlate follows the latter
+
 
| by the corresponding positive number.
+
<p>But all these ''ones'' denote the same identical individual denoted by <math>\mathrm{w}\!</math>;  what then can be the subjacent numbers to be applied to <math>\mathit{s}\!</math>, for instance, on account of its infinite &ldquo;''that is''&rdquo;'s?  What numbers can separate it from being identical with <math>\mathrm{w}\!</math>?  There are only two.  The first is ''zero'', which plainly neutralizes a comma completely, since</p>
 +
|-
 +
| align="center" | <math>\mathit{s},_0\!\mathrm{w} ~=~ \mathit{s}\mathrm{w}</math>
 +
|-
 
|
 
|
| A subjacent 'zero' makes the term itself the correlate.
+
<p>and the other is infinity;  for as <math>1^\infty</math> is indeterminate in ordinary algbra, so it will be shown hereafter to be here, so that to remove the correlate by the product of an infinite series of ''ones'' is to leave it indeterminate.</p>
 +
 
 +
<p>Accordingly,</p>
 +
|-
 +
| align="center" | <math>\mathrm{m},_\infty</math>
 +
|-
 
|
 
|
| Thus,
+
<p>should be regarded as expressing ''some'' man.</p>
 +
 
 +
<p>Any term, then, is properly to be regarded as having an infinite number of commas, all or some of which are neutralized by zeros.</p>
 +
 
 +
<p>&ldquo;Something&rdquo; may then be expressed by:</p>
 +
|-
 +
| align="center" | <math>\mathit{1}_\infty\!</math>
 +
|-
 
|
 
|
| 'l'_0
+
<p>I shall for brevity frequently express this by an antique figure one <math>(\mathfrak{1}).</math></p>
 +
 
 +
<p>&ldquo;Anything&rdquo; by:</p>
 +
|-
 +
| align="center" | <math>\mathit{1}_0\!</math>
 +
|-
 
|
 
|
| denotes the lover of 'that' lover or the lover of himself, just as
+
<p>I shall often also write a straight <math>1\!</math> for ''anything''.</p>
| `g`'o'h denotes that the horse is given to the owner of itself, for
+
 
| to make a term doubly a correlate is, by the distributive principle,
+
<p>(Peirce, CP 3.73).</p>
| to make each individual doubly a correlate, so that:
+
|}
|
+
 
| 'l'_0  =  L_0 +, L_0' +, L_0" +, etc.
+
===Commentary Note 8.1===
|
+
 
| A subjacent sign of infinity may
+
To my way of thinking, CP&nbsp;3.73 is one of the most remarkable passages in the history of logic. In this first pass over its deeper contents I won't be able to accord it much more than a superficial dusting off.
| indicate that the correlate is
 
| indeterminate, so that:
 
|
 
| 'l'_oo
 
|
 
| will denote a lover of something.
 
| We shall have some confirmation
 
| of this presently.
 
|
 
| If the last subjacent number is a 'one'
 
| it may be omitted. Thus we shall have:
 
|
 
| 'l'_1  = 'l',
 
|
 
| `g`_11  = `g`_1  = `g`.
 
|
 
| This enables us to retain our former expressions 'l'w, `g`'o'h, etc.
 
|
 
| C.S. Peirce, CP 3.69-70
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
</pre>
 
  
==Commentary Note 6==
+
Let us imagine a concrete example that will serve in developing the uses of Peirce's notation.  Entertain a discourse whose universe <math>X\!</math> will remind us a little of the cast of characters in Shakespeare's ''Othello''.
  
<pre>
+
{| align="center" cellspacing="6" width="90%"
Peirce's way of representing sets as sums may seem archaic, but it is
+
| <math>X ~=~ \{ \mathrm{Bianca}, \mathrm{Cassio}, \mathrm{Clown}, \mathrm{Desdemona}, \mathrm{Emilia}, \mathrm{Iago}, \mathrm{Othello} \}.</math>
quite often used, and is actually the tool of choice in many branches
+
|}
of algebra, combinatorics, computing, and statistics to this very day.
 
  
Peirce's application to logic is fairly novel, and the degree of his
+
The universe <math>X\!</math> is &ldquo;that class of individuals ''about'' which alone the whole discourse is understood to run&rdquo; but its marking out for special recognition as a universe of discourse in no way rules out the possibility that &ldquo;discourse may run upon something which is not a subjective part of the universe;  for instance, upon the qualities or collections of the individuals it contains&rdquo; (CP&nbsp;3.65).
elaboration of the logic of relative terms is certainly original with
 
him, but this particular genre of representation, commonly going under
 
the handle of "generating functions", goes way back, well before anyone
 
thought to stick a flag in set theory as a separate territory or to try
 
to fence off our native possessions of it with expressly decreed axioms.
 
And back in the days when computers were people, before we had the sorts
 
of "electronic register machines" that we take so much for granted today,
 
mathematicians were constantly using generating functions as a rough and
 
ready type of addressable memory to sort, store, and keep track of their
 
accounts of a wide variety of formal objects of thought.
 
  
Let us look at a few simple examples of generating functions,
+
In order to provide ourselves with the convenience of abbreviated terms, while preserving Peirce's conventions about capitalization, we may use the alternate names <math>^{\backprime\backprime}\mathrm{u}^{\prime\prime}</math> for the universe <math>X\!</math> and <math>^{\backprime\backprime}\mathrm{Jeste}^{\prime\prime}</math> for the character <math>\mathrm{Clown}.~\!</math>  This permits the above description of the universe of discourse to be rewritten in the following fashion:
much as I encountered them during my own first adventures in
 
the Fair Land Of Combinatoria.
 
  
Suppose that we are given a set of three elements,
+
{| align="center" cellspacing="6" width="90%"
say, {a, b, c}, and we are asked to find all the
+
| <math>\mathrm{u} ~=~ \{ \mathrm{B}, \mathrm{C}, \mathrm{D}, \mathrm{E}, \mathrm{I}, \mathrm{J}, \mathrm{O} \}</math>
ways of choosing a subset from this collection.
+
|}
  
We can represent this problem setup as the
+
This specification of the universe of discourse could be summed up in Peirce's notation by the following equation:
problem of computing the following product:
 
  
(1 + a)(1 + b)(1 + c).
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{*{15}{c}}
 +
\mathbf{1}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{C}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\end{array}</math>
 +
|}
  
The factor (1 + a) represents the option that we have, in choosing
+
Within this discussion, then, the ''individual terms'' are as follows:
a subset of {a, b, c}, to leave the 'a' out (signified by the "1"),
 
or else to include it (signified by the "a"), and likewise for the
 
other elements 'b' and 'c' in their turns.
 
  
Probably on account of all those years I flippered away
+
{| align="center" cellspacing="6" width="90%"
playing the oldtime pinball machines, I tend to imagine
+
|
a product like this being displayed in a vertical array:
+
<math>\begin{matrix}
 +
^{\backprime\backprime}\mathrm{B}^{\prime\prime}, &
 +
^{\backprime\backprime}\mathrm{C}^{\prime\prime}, &
 +
^{\backprime\backprime}\mathrm{D}^{\prime\prime}, &
 +
^{\backprime\backprime}\mathrm{E}^{\prime\prime}, &
 +
^{\backprime\backprime}\mathrm{I}^{\prime\prime}, &
 +
^{\backprime\backprime}\mathrm{J}^{\prime\prime}, &
 +
^{\backprime\backprime}\mathrm{O}^{\prime\prime}
 +
\end{matrix}</math>
 +
|}
  
(1 + a)
+
Each of these terms denotes in a singular fashion the corresponding individual in <math>X.\!</math>
(1 + b)
 
(1 + c)
 
  
I picture this as a playboard with six "bumpers",
+
By way of ''general terms'' in this discussion, we may begin with the following set:
the ball chuting down the board in such a career
 
that it strikes exactly one of the two bumpers
 
on each and every one of the three levels.
 
  
So a trajectory of the ball where it
+
{| align="center" cellspacing="6" width="90%"
hits the "a" bumper on the 1st level,
+
|
hits the "1" bumper on the 2nd level,
+
<math>\begin{array}{ccl}
hits the "c" bumper on the 3rd level,
+
^{\backprime\backprime}\mathrm{b}^{\prime\prime}
and then exits the board, represents
+
& = &
a single term in the desired product
+
^{\backprime\backprime}\mathrm{black}^{\prime\prime}
and corresponds to the subset {a, c}.
+
\\[6pt]
 +
^{\backprime\backprime}\mathrm{m}^{\prime\prime}
 +
& = &
 +
^{\backprime\backprime}\mathrm{man}^{\prime\prime}
 +
\\[6pt]
 +
^{\backprime\backprime}\mathrm{w}^{\prime\prime}
 +
& = &
 +
^{\backprime\backprime}\mathrm{woman}^{\prime\prime}
 +
\end{array}</math>
 +
|}
  
Multiplying out (1 + a)(1 + b)(1 + c), one obtains:
+
The denotation of a general term may be given by means of an equation between terms:
  
1 + a + b + c + ab + ac + bc + abc.
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{*{15}{c}}
 +
\mathrm{b}
 +
& =      & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{m}
 +
& =      & \mathrm{C}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{w}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
\end{array}</math>
 +
|}
  
And this informs us that the subsets of choice are:
+
===Commentary Note 8.2===
  
{}, {a}, {b}, {c}, {a, b}, {a, c}, {b, c}, {a, b, c}.
+
I continue with my commentary on CP&nbsp;3.73, developing the ''Othello'' example as a way of illustrating Peirce's concepts.
</pre>
 
  
==Selection 7==
+
In the development of the story so far, we have a universe of discourse that can be characterized by means of the following system of equations:
  
<pre>
+
{| align="center" cellspacing="6" width="90%"
| The Signs for Multiplication (cont.)
 
 
|
 
|
| The associative principle does not hold in this counting
+
<math>\begin{array}{*{15}{c}}
| of factors.  Because it does not hold, these subjacent
+
\mathbf{1}
| numbers are frequently inconvenient in practice, and
+
& =      & \mathrm{B}
| I therefore use also another mode of showing where
+
& +\!\!, & \mathrm{C}
| the correlate of a term is to be found.  This is
+
& +\!\!, & \mathrm{D}
| by means of the marks of reference, † ‡ || § ¶,
+
& +\!\!, & \mathrm{E}
| which are placed subjacent to the relative
+
& +\!\!, & \mathrm{I}
| term and before and above the correlate.
+
& +\!\!, & \mathrm{J}
| Thus, giver of a horse to a lover of
+
& +\!\!, & \mathrm{O}
| a woman may be written:
+
\\[6pt]
 +
\mathrm{b}
 +
& =      & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{m}
 +
& =      & \mathrm{C}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{w}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
\end{array}</math>
 +
|}
 +
 
 +
This much provides a basis for collection of absolute terms that I plan to use in this example.  Let us now consider how we might represent a sufficiently exemplary collection of relative terms.
 +
 
 +
Consider the genesis of relative terms, for example:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| `g`_†‡ †'l'_|| ||w ‡h.
+
<math>\begin{array}{l}
 +
^{\backprime\backprime}\, \text{lover of}\, \underline{~~ ~~}\, ^{\prime\prime}
 +
\\[6pt]
 +
^{\backprime\backprime}\, \text{betrayer to}\, \underline{~~ ~~}\, \text{of}\, \underline{~~ ~~}\, ^{\prime\prime}
 +
\\[6pt]
 +
^{\backprime\backprime}\, \text{winner over of}\, \underline{~~ ~~}\, \text{to}\, \underline{~~ ~~}\, \text{from}\, \underline{~~ ~~}\, ^{\prime\prime}
 +
\end{array}</math>
 +
|}
 +
 
 +
We may regard these fill-in-the-blank forms as being derived by a kind of ''rhematic abstraction'' from the corresponding instances of absolute terms.
 +
 
 +
In other words:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| The asterisk I use exclusively to refer to the last
+
<p>The relative term <math>^{\backprime\backprime}\, \text{lover of}\, \underline{~~ ~~}\, ^{\prime\prime}</math></p>
| correlate of the last relative of the algebraic term.
+
 
 +
<p>can be reached by removing the absolute term <math>^{\backprime\backprime}\, \text{Emilia}\, ^{\prime\prime}</math></p>
 +
 
 +
<p>from the absolute term <math>^{\backprime\backprime}\, \text{lover of Emilia}\, ^{\prime\prime}.</math></p>
 +
 
 +
<p><math>\text{Iago}</math> is a lover of <math>\text{Emilia},</math> so the relate-correlate pair <math>\mathrm{I}:\mathrm{E}</math></p>
 +
 
 +
<p>lies in the 2-adic relation associated with the relative term <math>^{\backprime\backprime}\, \text{lover of}\, \underline{~~ ~~}\, ^{\prime\prime}.</math></p>
 +
|-
 
|
 
|
| Now, considering the order of multiplication to be: --
+
<p>The relative term <math>^{\backprime\backprime}\, \text{betrayer to}\, \underline{~~ ~~}\, \text{of}\, \underline{~~ ~~}\, ^{\prime\prime}</math></p>
| a term, a correlate of it, a correlate of that correlate,
+
 
| etc. -- there is no violation of the associative principle.
+
<p>can be reached by removing the absolute terms <math>^{\backprime\backprime}\, \text{Othello}\, ^{\prime\prime}</math> and <math>^{\backprime\backprime}\, \text{Desdemona}\, ^{\prime\prime}</math></p>
| The only violations of it in this mode of notation are that
+
 
| in thus passing from relative to correlate, we skip about
+
<p>from the absolute term <math>^{\backprime\backprime}\, \text{betrayer to Othello of Desdemona}\, ^{\prime\prime}.</math></p>
| among the factors in an irregular manner, and that we
+
 
| cannot substitute in such an expression as `g`'o'h
+
<p><math>\text{Iago}</math> is a betrayer to <math>\text{Othello}</math> of <math>\text{Desdemona},</math> so the relate-correlate-correlate triple <math>\mathrm{I}:\mathrm{O}:\mathrm{D}</math></p>
| a single letter for 'o'h.
+
 
|
+
<p>lies in the 3-adic relation assciated with the relative term <math>^{\backprime\backprime}\, \text{betrayer to}\, \underline{~~ ~~}\, \text{of}\, \underline{~~ ~~}\, ^{\prime\prime}.\!</math></p>
| I would suggest that such a notation may be found useful in treating other
+
|-
| cases of non-associative multiplication.  By comparing this with what was
 
| said above [in CP 3.55] concerning functional multiplication, it appears
 
| that multiplication by a conjugative term is functional, and that the
 
| letter denoting such a term is a symbol of operation.  I am therefore
 
| using two alphabets, the Greek and Kennerly, where only one was
 
| necessary.  But it is convenient to use both.
 
|
 
| C.S. Peirce, CP 3.71-72
 
 
|
 
|
| Charles Sanders Peirce,
+
<p>The relative term <math>^{\backprime\backprime}\, \text{winner over of}\, \underline{~~ ~~}\, \text{to}\, \underline{~~ ~~}\, \text{from}\, \underline{~~ ~~}\, ^{\prime\prime}</math></p>
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
</pre>
 
  
==Commentary Note 7==
+
<p>can be reached by removing the absolute terms <math>^{\backprime\backprime}\, \text{Othello}\, ^{\prime\prime},</math> <math>^{\backprime\backprime}\, \text{Iago}\, ^{\prime\prime},</math> and <math>^{\backprime\backprime}\, \text{Cassio}\, ^{\prime\prime}</math></p>
  
<pre>
+
<p>from the absolute term <math>^{\backprime\backprime}\, \text{winner over of Othello to Iago from Cassio}\, ^{\prime\prime}.</math></p>
NB.  On account of the invideous circumstance that various
 
listservers balk at Peirce's "marks of reference" -- or is
 
it only the Microsoft Cryptkeeper's kryptonizing of them? --
 
I will make the following substitutions in Peirce's text:
 
  
@  =  dagger symbol
+
<p><math>\text{Iago}</math> is a winner over of <math>\text{Othello}</math> to <math>\text{Iago}</math> from <math>\text{Cassio},\!</math> so the elementary relative term <math>\mathrm{I}:\mathrm{O}:\mathrm{I}:\mathrm{C}</math></p>
#  =  double dagger
 
|| =  parallel sign
 
$  =  section symbol
 
%  =  paragraph mark
 
  
It is clear from our last excerpt that Peirce is already on the verge
+
<p>lies in the 4-adic relation associated with the relative term <math>^{\backprime\backprime}\, \text{winner over of}\, \underline{~~ ~~}\, \text{to}\, \underline{~~ ~~}\, \text{from}\, \underline{~~ ~~}\, ^{\prime\prime}.</math></p>
of a graphical syntax for the logic of relatives. Indeed, it seems
+
|}
likely that he had already reached this point in his own thinking.
 
  
For instance, it seems quite impossible to read his last variation on the
+
===Commentary Note 8.3===
theme of a "giver of a horse to a lover of a woman" without drawing lines
 
of identity to connect up the corresponding marks of reference, like this:
 
  
o---------------------------------------o
+
Speaking very strictly, we need to be careful to distinguish a ''relation'' from a ''relative term''.
|                                      |
 
|            @        ||                |
 
|          / \      /  \              |
 
|          o  o    o    o              |
 
|      `g`_@#  @'l'_||  ||w  #h        |
 
|          o                o          |
 
|            \______________/          |
 
|                  #                  |
 
|                                      |
 
o---------------------------------------o
 
Giver of a Horse to a Lover of a Woman
 
</pre>
 
  
==Selection 8==
+
{| align="center" cellspacing="6" width="90%"
 
 
<pre>
 
| The Signs for Multiplication (cont.)
 
 
|
 
|
| Thus far, we have considered the multiplication of relative terms only.
+
<p>The relation is an ''object'' of thought that may be regarded ''in extension'' as a set of ordered tuples that are known as its ''elementary relations''.</p>
| Since our conception of multiplication is the application of a relation,
+
|-
| we can only multiply absolute terms by considering them as relatives.
 
 
|
 
|
| Now the absolute term "man" is really exactly equivalent to
+
<p>The relative term is a ''sign'' that denotes certain objects, called its ''relates'', as these are determined in relation to certain other objects, called its ''correlates''.  Under most circumstances, one may also regard the relative term as denoting the corresponding relation.</p>
| the relative term "man that is ---", and so with any other.
+
|}
| I shall write a comma after any absolute term to show that
+
 
| it is so regarded as a relative term.
+
Returning to the Othello example, let us take up the 2-adic relatives <math>^{\backprime\backprime}\, \text{lover of}\, \underline{~~ ~~}\, ^{\prime\prime}</math> and <math>^{\backprime\backprime}\, \text{servant of}\, \underline{~~ ~~}\, ^{\prime\prime}.</math>
 +
 
 +
Ignoring the many splendored nuances appurtenant to the idea of love, we may regard the relative term <math>\mathit{l}\!</math> for <math>^{\backprime\backprime}\, \text{lover of}\, \underline{~~ ~~}\, ^{\prime\prime}</math> to be given by the following equation:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| Then:
+
<math>\begin{array}{*{13}{c}}
 +
\mathit{l}
 +
& = &
 +
\mathrm{B}:\mathrm{C}
 +
& +\!\!, &
 +
\mathrm{C}:\mathrm{B}
 +
& +\!\!, &
 +
\mathrm{D}:\mathrm{O}
 +
& +\!\!, &
 +
\mathrm{E}:\mathrm{I}
 +
& +\!\!, &
 +
\mathrm{I}:\mathrm{E}
 +
& +\!\!, &
 +
\mathrm{O}:\mathrm{D}
 +
\end{array}</math>
 +
|}
 +
 
 +
If for no better reason than to make the example more interesting, let us put aside all distinctions of rank and fealty, collapsing the motley crews of attendant, servant, subordinate, and so on, under the heading of a single service, denoted by the relative term <math>\mathit{s}\!</math> for <math>^{\backprime\backprime}\, \text{servant of}\, \underline{~~ ~~}\, ^{\prime\prime}.</math>  The terms of this service are:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| "man that is black"
+
<math>\begin{array}{*{11}{c}}
|
+
\mathit{s}
| will be written
+
& = &
 +
\mathrm{C}:\mathrm{O}
 +
& +\!\!, &
 +
\mathrm{E}:\mathrm{D}
 +
& +\!\!, &
 +
\mathrm{I}:\mathrm{O}
 +
& +\!\!, &
 +
\mathrm{J}:\mathrm{D}
 +
& +\!\!, &
 +
\mathrm{J}:\mathrm{O}
 +
\end{array}</math>
 +
|}
 +
 
 +
The term <math>\mathrm{I}:\mathrm{C}\!</math> may also be implied, but, since it is so hotly arguable, I will leave it out of the toll.
 +
 
 +
One more thing that we need to be duly wary about:  There are many different conventions in the field as to the ordering of terms in their applications, and it happens that different conventions will be more convenient under different circumstances, so there does not appear to be much of a chance that any one of them can be canonized once and for all.
 +
 
 +
In the current reading, we are applying relative terms from right to left, and so our conception of relative multiplication, or relational composition, will need to be adjusted accordingly.
 +
 
 +
===Commentary Note 8.4===
 +
 
 +
To familiarize ourselves with the forms of calculation that are available in Peirce's notation, let us compute a few of the simplest products that we find at hand in the Othello case.
 +
 
 +
Here are the absolute terms:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| m,b.
+
<math>\begin{array}{*{15}{c}}
 +
\mathbf{1}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{C}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{b}
 +
& =      & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{m}
 +
& =      & \mathrm{C}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{w}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
\end{array}\!</math>
 +
|}
 +
 
 +
Here are the 2-adic relative terms:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| But not only may any absolute term be thus regarded as a relative term,
+
<math>\begin{array}{*{13}{c}}
| but any relative term may in the same way be regarded as a relative with
+
\mathit{l}
| one correlate more.  It is convenient to take this additional correlate
+
& =      & \mathrm{B}:\mathrm{C}
| as the first one.
+
& +\!\!, & \mathrm{C}:\mathrm{B}
 +
& +\!\!, & \mathrm{D}:\mathrm{O}
 +
& +\!\!, & \mathrm{E}:\mathrm{I}
 +
& +\!\!, & \mathrm{I}:\mathrm{E}
 +
& +\!\!, & \mathrm{O}:\mathrm{D}
 +
\\[6pt]
 +
\mathit{s}
 +
& =      & \mathrm{C}:\mathrm{O}
 +
& +\!\!, & \mathrm{E}:\mathrm{D}
 +
& +\!\!, & \mathrm{I}:\mathrm{O}
 +
& +\!\!, & \mathrm{J}:\mathrm{D}
 +
& +\!\!, & \mathrm{J}:\mathrm{O}
 +
\end{array}</math>
 +
|}
 +
 
 +
Here are a few of the simplest products among these terms:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| Then:
+
<math>\begin{array}{lll}
 +
\mathit{l}\mathbf{1}
 +
& = &
 +
\text{lover of anything}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{B}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{D})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{B} ~+\!\!,~ \mathrm{C} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{E} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{J} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{B} ~+\!\!,~ \mathrm{C} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{E} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{O}
 +
\\[6pt]
 +
& = &
 +
\text{anything except}~\mathrm{J}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| 'l','s'w
+
<math>\begin{array}{lll}
 +
\mathit{l}\mathrm{b}
 +
& = &
 +
\text{lover of a black}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{B}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{D})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
\mathrm{O}
 +
\\[6pt]
 +
& = &
 +
\mathrm{D}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| will denote a lover of a woman that is a servant of that woman.
+
<math>\begin{array}{lll}
 +
\mathit{l}\mathrm{m}
 +
& = &
 +
\text{lover of a man}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{B}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{D})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{C} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{J} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{B} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{E}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| The comma here after 'l' should not be considered as altering at
+
<math>\begin{array}{lll}
| all the meaning of 'l', but as only a subjacent sign, serving to
+
\mathit{l}\mathrm{w}
| alter the arrangement of the correlates.
+
& = &
 +
\text{lover of a woman}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{B}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{D})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{B} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{E})
 +
\\[6pt]
 +
& = &
 +
\mathrm{C} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{O}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| In point of fact, since a comma may be added in this way to any
+
<math>\begin{array}{lll}
| relative term, it may be added to one of these very relatives
+
\mathit{s}\mathbf{1}
| formed by a comma, and thus by the addition of two commas
+
& = &
| an absolute term becomes a relative of two correlates.
+
\text{servant of anything}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{O})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{B} ~+\!\!,~ \mathrm{C} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{E} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{J} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{C} ~+\!\!,~ \mathrm{E} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{J}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| So:
+
<math>\begin{array}{lll}
 +
\mathit{s}\mathrm{b}
 +
& = &
 +
\text{servant of a black}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{O})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
\mathrm{O}
 +
\\[6pt]
 +
& = &
 +
\mathrm{C} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{J}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| m,,b,r
+
<math>\begin{array}{lll}
 +
\mathit{s}\mathrm{m}
 +
& = &
 +
\text{servant of a man}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{O})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{C} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{J} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{C} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{J}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| interpreted like
+
<math>\begin{array}{lll}
 +
\mathit{s}\mathrm{w}
 +
& = &
 +
\text{servant of a woman}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{O})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{B} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{E})
 +
\\[6pt]
 +
& = &
 +
\mathrm{E} ~+\!\!,~ \mathrm{J}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| `g`'o'h
+
<math>\begin{array}{lll}
 +
\mathit{l}\mathit{s}
 +
& = &
 +
\text{lover of a servant of}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{B}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{D})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{C}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{B}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{D}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| means a man that is a rich individual and
+
<math>\begin{array}{lll}
| is a black that is that rich individual.
+
\mathit{s}\mathit{l}
 +
& = &
 +
\text{servant of a lover of}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{O})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{B}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{D})
 +
\\[6pt]
 +
& = &
 +
\mathrm{C}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{O}
 +
\end{array}</math>
 +
|}
 +
 
 +
Among other things, one observes that the relative terms <math>\mathit{l}\!</math> and <math>\mathit{s}\!</math> do not commute, that is, <math>\mathit{l}\mathit{s}\!</math> is not equal to <math>\mathit{s}\mathit{l}.~\!</math>
 +
 
 +
===Commentary Note 8.5===
 +
 
 +
Since multiplication by a 2-adic relative term is a logical analogue of matrix multiplication in linear algebra, all of the products that we computed above can be represented in terms of logical matrices and logical vectors.
 +
 
 +
Here are the absolute terms again, followed by their representation as ''coefficient tuples'', otherwise thought of as ''coordinate vectors''.
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| But this has no other meaning than:
+
<math>\begin{array}{ccrcccccccccccl}
 +
\mathbf{1}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{C}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[10pt]
 +
& = & (1 & , & 1 & , & 1 & , & 1 & , & 1 & , & 1 & , & 1)
 +
\\[20pt]
 +
\mathrm{b}
 +
& = &
 +
&  &
 +
&  &
 +
&  &
 +
&  &
 +
&  &
 +
&  &
 +
\mathrm{O}
 +
\\[10pt]
 +
& = & (0 & , & 0 & , & 0 & , & 0 & , & 0 & , & 0 & , & 1)
 +
\\[20pt]
 +
\mathrm{m}
 +
& =      &
 +
&        & \mathrm{C}
 +
&        &
 +
&        &
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[10pt]
 +
& = & (0 & , & 1 & , & 0 & , & 0 & , & 1 & , & 1 & , & 1)
 +
\\[20pt]
 +
\mathrm{w}
 +
& =      & \mathrm{B}
 +
&        &
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
&        &
 +
&        &
 +
&        &
 +
\\[10pt]
 +
& = & (1 & , & 0 & , & 1 & , & 1 & , & 0 & , & 0 & , & 0)
 +
\end{array}</math>
 +
|}
 +
 
 +
Since we are going to be regarding these tuples as ''column vectors'', it is convenient to arrange them into a table of the following form:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| m,b,r
+
<math>\begin{array}{c|cccc}
 +
\text{  } & \mathbf{1} & \mathrm{b} & \mathrm{m} & \mathrm{w}
 +
\\
 +
\text{---} & \text{---} & \text{---} & \text{---} & \text{---}
 +
\\
 +
\mathrm{B} & 1 & 0 & 0 & 1
 +
\\
 +
\mathrm{C} & 1 & 0 & 1 & 0
 +
\\
 +
\mathrm{D} & 1 & 0 & 0 & 1
 +
\\
 +
\mathrm{E} & 1 & 0 & 0 & 1
 +
\\
 +
\mathrm{I} & 1 & 0 & 1 & 0
 +
\\
 +
\mathrm{J} & 1 & 0 & 1 & 0
 +
\\
 +
\mathrm{O} & 1 & 1 & 1 & 0
 +
\end{array}</math>
 +
|}
 +
 
 +
Here are the 2-adic relative terms again, followed by their representation as coefficient matrices, in this case bordered by row and column labels to remind us what the coefficient values are meant to signify.
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| or a man that is a black that is rich.
+
<math>\begin{array}{*{13}{c}}
 +
\mathit{l}
 +
& =      & \mathrm{B}:\mathrm{C}
 +
& +\!\!, & \mathrm{C}:\mathrm{B}
 +
& +\!\!, & \mathrm{D}:\mathrm{O}
 +
& +\!\!, & \mathrm{E}:\mathrm{I}
 +
& +\!\!, & \mathrm{I}:\mathrm{E}
 +
& +\!\!, & \mathrm{O}:\mathrm{D}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| Thus we see that, after one comma is added, the
+
<math>\begin{array}{c|ccccccc}
| addition of another does not change the meaning
+
\mathit{l} &
| at all, so that whatever has one comma after it
+
\mathrm{B} &
| must be regarded as having an infinite number.
+
\mathrm{C} &
 +
\mathrm{D} &
 +
\mathrm{E} &
 +
\mathrm{I} &
 +
\mathrm{J} &
 +
\mathrm{O}
 +
\\
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---}
 +
\\
 +
\mathrm{B} & 0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
\mathrm{C} & 1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
\mathrm{D} & 0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
\mathrm{E} & 0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
\mathrm{I} & 0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
\mathrm{J} & 0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
\mathrm{O} & 0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| If, therefore, 'l',,'s'w is not the same as 'l','s'w (as it plainly is not,
+
<math>\begin{array}{*{13}{c}}
| because the latter means a lover and servant of a woman, and the former a
+
\mathit{s}
| lover of and servant of and same as a woman), this is simply because the
+
& =      & \mathrm{C}:\mathrm{O}
| writing of the comma alters the arrangement of the correlates.
+
& +\!\!, & \mathrm{E}:\mathrm{D}
 +
& +\!\!, & \mathrm{I}:\mathrm{O}
 +
& +\!\!, & \mathrm{J}:\mathrm{D}
 +
& +\!\!, & \mathrm{J}:\mathrm{O}
 +
\end{array}</math>
 +
|}
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| And if we are to suppose that absolute terms are multipliers
+
<math>\begin{array}{c|ccccccc}
| at all (as mathematical generality demands that we should},
+
\mathit{s} &
| we must regard every term as being a relative requiring
+
\mathrm{B} &
| an infinite number of correlates to its virtual infinite
+
\mathrm{C} &
| series "that is --- and is --- and is --- etc."
+
\mathrm{D} &
 +
\mathrm{E} &
 +
\mathrm{I} &
 +
\mathrm{J} &
 +
\mathrm{O}
 +
\\
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---} &
 +
\text{---}
 +
\\
 +
\mathrm{B} & 0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
\mathrm{C} & 0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
\mathrm{D} & 0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
\mathrm{E} & 0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
\mathrm{I} & 0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
\mathrm{J} & 0 & 0 & 1 & 0 & 0 & 0 & 1
 +
\\
 +
\mathrm{O} & 0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{array}</math>
 +
|}
 +
 
 +
Here are the matrix representations of the products that we calculated before:
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| Now a relative formed by a comma of course receives its
+
<math>\begin{matrix}
| subjacent numbers like any relative, but the question is,
+
\mathit{l}\mathbf{1} & = & \text{lover of anything} & =
| What are to be the implied subjacent numbers for these
+
\end{matrix}</math>
| implied correlates?
+
|-
 
|
 
|
| Any term may be regarded as having an
+
<math>
| infinite number of factors, those
+
\begin{bmatrix}
| at the end being 'ones', thus:
+
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 0 \\ 1
 +
\end{bmatrix}
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| 'l','s'w  = 'l','s'w,!1!,!1!,!1!,!1!,!1!,!1!,!1!, etc.
+
<math>\begin{matrix}
 +
\mathit{l}\mathrm{b} & = & \text{lover of a black} & =
 +
\end{matrix}</math>
 +
|-
 
|
 
|
| A subjacent number may therefore be as great as we please.
+
<math>
 +
\begin{bmatrix}
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 \\ 0 \\ 0 \\ 0 \\ 0 \\ 0 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 0 \\ 1 \\ 0 \\ 0 \\ 0 \\ 0
 +
\end{bmatrix}
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| But all these 'ones' denote the same identical individual denoted
+
<math>\begin{matrix}
| by w;  what then can be the subjacent numbers to be applied to 's',
+
\mathit{l}\mathrm{m} & = & \text{lover of a man} & =
| for instance, on account of its infinite "that is"'s?  What numbers
+
\end{matrix}</math>
| can separate it from being identical with w?  There are only two.
+
|-
| The first is 'zero', which plainly neutralizes a comma completely,
 
| since
 
 
|
 
|
| 's',_0 w  = 's'w
+
<math>
 +
\begin{bmatrix}
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
1 \\ 0 \\ 1 \\ 1 \\ 0 \\ 0 \\ 0
 +
\end{bmatrix}
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| and the other is infinity;  for as 1^oo is indeterminate
+
<math>\begin{matrix}
| in ordinary algbra, so it will be shown hereafter to be
+
\mathit{l}\mathrm{w} & = & \text{lover of a woman} & =
| here, so that to remove the correlate by the product of
+
\end{matrix}</math>
| an infinite series of 'ones' is to leave it indeterminate.
+
|-
 
|
 
|
| Accordingly,
+
<math>
 +
\begin{bmatrix}
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
1 \\ 0 \\ 1 \\ 1 \\ 0 \\ 0 \\ 0
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 0 \\ 1
 +
\end{bmatrix}\!
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| m,_oo
+
<math>\begin{matrix}
 +
\mathit{s}\mathbf{1} & = & \text{servant of anything} & =
 +
\end{matrix}</math>
 +
|-
 
|
 
|
| should be regarded as expressing 'some' man.
+
<math>
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 1 \\ 1 \\ 1 \\ 0
 +
\end{bmatrix}
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| Any term, then, is properly to be regarded as having an infinite
+
<math>\begin{matrix}
| number of commas, all or some of which are neutralized by zeros.
+
\mathit{s}\mathrm{b} & = & \text{servant of a black} & =
 +
\end{matrix}</math>
 +
|-
 
|
 
|
| "Something" may then be expressed by:
+
<math>
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 \\ 0 \\ 0 \\ 0 \\ 0 \\ 0 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 1 \\ 0
 +
\end{bmatrix}
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| !1!_oo.
+
<math>\begin{matrix}
 +
\mathit{s}\mathrm{m} & = & \text{servant of a man} & =
 +
\end{matrix}</math>
 +
|-
 
|
 
|
| I shall for brevity frequently express this by an antique figure one (`1`).
+
<math>
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 1 \\ 0
 +
\end{bmatrix}
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 +
|
 +
<math>\begin{matrix}
 +
\mathit{s}\mathrm{w} & = & \text{servant of a woman} & =
 +
\end{matrix}\!</math>
 +
|-
 
|
 
|
| "Anything" by:
+
<math>
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
1 \\ 0 \\ 1 \\ 1 \\ 0 \\ 0 \\ 0
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 0 \\ 0 \\ 1 \\ 0 \\ 1 \\ 0
 +
\end{bmatrix}
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| !1!_0.
+
<math>\begin{matrix}
 +
\mathit{l}\mathit{s} & = & \text{lover of a servant of ---} & =
 +
\end{matrix}</math>
 +
|-
 
|
 
|
| I shall often also write a straight 1 for 'anything'.
+
<math>
 +
\begin{bmatrix}
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
</math>
 +
|}
 +
 
 +
{| align="center" cellpadding="6" width="90%"
 
|
 
|
| C.S. Peirce, CP 3.73
+
<math>\begin{matrix}
 +
\mathit{s}\mathit{l} & = & \text{servant of a lover of ---} & =
 +
\end{matrix}</math>
 +
|-
 
|
 
|
| Charles Sanders Peirce,
+
<math>
|"Description of a Notation for the Logic of Relatives,
+
\begin{bmatrix}
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
+
0 & 0 & 0 & 0 & 0 & 0 & 0
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
+
\\
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
+
0 & 0 & 0 & 0 & 0 & 0 & 1
</pre>
+
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 1
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\end{bmatrix}
 +
</math>
 +
|}
  
==Commentary Note 8.1==
+
===Commentary Note 8.6===
  
<pre>
+
The foregoing has hopefully filled in enough background that we can begin to make sense of the more mysterious parts of CP&nbsp;3.73.
To my way of thinking, CP 3.73 is one of the most remarkable passages
 
in the history of logic.  In this first pass over its deeper contents
 
I won't be able to accord it much more than a superficial dusting off.
 
  
As always, it is probably best to begin with a concrete example.
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
So let us initiate a discourse, whose universe X may remind us
+
|
a little of the cast of characters in Shakespeare's 'Othello'.
+
<p>Thus far, we have considered the multiplication of relative terms only. Since our conception of multiplication is the application of a relation, we can only multiply absolute terms by considering them as relatives.</p>
  
X =  {Bianca, Cassio, Clown, Desdemona, Emilia, Iago, Othello}.
+
<p>Now the absolute term &ldquo;man&rdquo; is really exactly equivalent to the relative term &ldquo;man that is&nbsp;&mdash;&mdash;&rdquo;, and so with any other. I shall write a comma after any absolute term to show that it is so regarded as a relative term.</p>
  
The universe X is "that class of individuals 'about' which alone
+
<p>Then &ldquo;man that is black&rdquo; will be written:</p>
the whole discourse is understood to run" but its marking out for
+
|-
special recognition as a universe of discourse in no way rules out
+
| align="center" | <math>\mathrm{m},\!\mathrm{b}</math>
the possibility that "discourse may run upon something which is not
+
|-
a subjective part of the universe;  for instance, upon the qualities
+
|
or collections of the individuals it contains" (CP 3.65).
+
<p>(Peirce, CP 3.73).</p>
 +
|}
  
In order to provide ourselves with the convenience of abbreviated terms,
+
In any system where elements are organized according to types, there tend to be any number of ways in which elements of one type are naturally associated with elements of another type.  If the association is anything like a logical equivalence, but with the first type being lower and the second type being higher in some sense, then one may speak of a ''semantic ascent'' from the lower to the higher type.
while staying a bit closer to Peirce's conventions about capitalization,
 
let us rename the universe "u", the Clown "Jeste", and then rewrite the
 
above description of the universe of discourse in the following fashion:
 
  
=  {B, C, D, E, I, J, O}.
+
For example, it is common in mathematics to associate an element <math>a\!</math> of a set <math>A\!</math> with the constant function <math>f_a : X \to A</math> that has <math>f_a (x) = a\!</math> for all <math>x\!</math> in <math>X,\!</math> where <math>X\!</math> is an arbitrary set. Indeed, the correspondence is so close that one often uses the same name <math>{}^{\backprime\backprime} a {}^{\prime\prime}</math> to denote both the element <math>a\!</math> in <math>A\!</math> and the function <math>a = f_a : X \to A,</math> relying on the context or an explicit type indication to tell them apart.
  
This specification of the universe of discourse could be
+
For another example, we have the ''tacit extension'' of a <math>k\!</math>-place relation <math>L \subseteq X_1 \times \ldots \times X_k\!</math> to a <math>(k+1)\!</math>-place relation <math>L^\prime \subseteq X_1 \times \ldots \times X_{k+1}\!</math> that we get by letting <math>L^\prime = L \times X_{k+1},</math> that is, by maintaining the constraints of <math>L\!</math> on the first <math>k\!</math> variables and letting the last variable wander freely.
summed up in Peirce's notation by the following equation:
 
  
1  =  B +, C +, D +, E +, I +, J +, O.
+
What we have here, if I understand Peirce correctly, is another such type of natural extension, sometimes called the ''diagonal extension''.  This extension associates a <math>k\!</math>-adic relative or a <math>k\!</math>-adic relation, counting the absolute term and the set whose elements it denotes as the cases for <math>k = 0,\!</math> with a series of relatives and relations of higher adicities.
  
Within this discussion, then, the "individual terms" are
+
A few examples will suffice to anchor these ideas.
"B", "C", "D", "E", "I", "J", "O", each of which denotes
 
in a singular fashion the corresponding individual in X.
 
  
As "general terms" of this discussion,
+
Absolute terms:
we might begin with the following set:
 
  
"b" = "black"
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{*{11}{c}}
 +
\mathrm{m}
 +
& =      & \text{man}
 +
& =      & \mathrm{C}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{n}
 +
& =      & \text{noble}
 +
& =      & \mathrm{C}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{w}
 +
& =      & \text{woman}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
\end{array}</math>
 +
|}
  
"m"  =  "man"
+
Diagonal extensions:
  
"w" = "woman"
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{*{11}{c}}
 +
\mathrm{m,}
 +
& =      & \text{man that is}\, \underline{~~ ~~}
 +
& =      & \mathrm{C}:\mathrm{C}
 +
& +\!\!, & \mathrm{I}:\mathrm{I}
 +
& +\!\!, & \mathrm{J}:\mathrm{J}
 +
& +\!\!, & \mathrm{O}:\mathrm{O}
 +
\\[6pt]
 +
\mathrm{n,}
 +
& =      & \text{noble that is}\, \underline{~~ ~~}
 +
& =      & \mathrm{C}:\mathrm{C}
 +
& +\!\!, & \mathrm{D}:\mathrm{D}
 +
& +\!\!, & \mathrm{O}:\mathrm{O}
 +
\\[6pt]
 +
\mathrm{w,}
 +
& =      & \text{woman that is}\, \underline{~~ ~~}
 +
& =      & \mathrm{B}:\mathrm{B}
 +
& +\!\!, & \mathrm{D}:\mathrm{D}
 +
& +\!\!, & \mathrm{E}:\mathrm{E}
 +
\end{array}</math>
 +
|}
  
In Peirce's notation, the denotation of a general term
+
Sample products:
can be expressed by means of an equation between terms:
 
  
= O
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
\mathrm{m},\!\mathrm{n}
 +
& = &
 +
\text{man that is noble}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{C} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{C} ~+\!\!,~ \mathrm{O}
 +
\end{array}</math>
 +
|}
  
m = C +, I +, J +, O
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
\mathrm{n},\!\mathrm{m}
 +
& = &
 +
\text{noble that is a man}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{C} ~+\!\!,~ \mathrm{I} ~+\!\!,~ \mathrm{J} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{C} ~+\!\!,~ \mathrm{O}
 +
\end{array}</math>
 +
|}
  
w = B +, D +, E
+
{| align="center" cellspacing="6" width="90%"
</pre>
+
|
 +
<math>\begin{array}{lll}
 +
\mathrm{w},\!\mathrm{n}
 +
& = &
 +
\text{woman that is noble}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{B}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{E})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{C} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{D}
 +
\end{array}</math>
 +
|}
  
==Commentary Note 8.2==
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
\mathrm{n},\!\mathrm{w}
 +
& = &
 +
\text{noble that is a woman}
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O})
 +
\\
 +
& &
 +
\times
 +
\\
 +
& &
 +
(\mathrm{B} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{E})
 +
\\[6pt]
 +
& = &
 +
\mathrm{D}
 +
\end{array}</math>
 +
|}
  
<pre>
+
==Selection 9==
I will continue with my commentary on CP 3.73, developing
 
the Othello example as a way of illustrating its concepts.
 
  
In the development of the story so far, we have a universe of discourse
+
===The Signs for Multiplication (cont.)===
that can be characterized by means of the following system of equations:
 
  
1 =  B +, C +, D +, E +, I +, J +, O
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>It is obvious that multiplication into a multiplicand indicated by a comma is commutative<sup>1</sup>, that is,</p>
 +
|-
 +
| align="center" | <math>\mathit{s},\!\mathit{l} ~=~ \mathit{l},\!\mathit{s}</math>
 +
|-
 +
|
 +
<p>This multiplication is effectively the same as that of Boole in his logical calculus.  Boole's unity is my <math>\mathbf{1},</math> that is, it denotes whatever is.</p>
  
b = O
+
#<p>It will often be convenient to speak of the whole operation of affixing a comma and then multiplying as a commutative multiplication, the sign for which is the comma. But though this is allowable, we shall fall into confusion at once if we ever forget that in point of fact it is not a different multiplication, only it is multiplication by a relative whose meaning &mdash; or rather whose syntax &mdash; has been slightly altered; and that the comma is really the sign of this modification of the foregoing term.</p>
  
m  =  C +, I +, J +, O
+
<p>(Peirce, CP 3.74).</p>
 +
|}
  
= B +, D +, E
+
===Commentary Note 9.1===
  
This much provides a basis for collection of absolute terms that
+
Let us backtrack a few years, and consider how George Boole explained his twin conceptions of ''selective operations'' and ''selective symbols''.
I plan to use in this example.  Let us now consider how we might
 
represent a sufficiently exemplary collection of relative terms.
 
  
If we consider the genesis of relative terms, for example, "lover of ---",
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
"betrayer to --- of ---", or "winner over of --- to --- from ---", we may
+
|
regard these fill-in-the-blank forms as being derived by way of a kind of
+
<p>Let us then suppose that the universe of our discourse is the actual universe, so that words are to be used in the full extent of their meaning, and let us consider the two mental operations implied by the words &ldquo;white&rdquo; and &ldquo;men&rdquo;.  The word &ldquo;men&rdquo; implies the operation of selecting in thought from its subject, the universe, all men;  and the resulting conception, ''men'', becomes the subject of the next operation.  The operation implied by the word &ldquo;white&rdquo; is that of selecting from its subject, &ldquo;men&rdquo;, all of that class which are white.  The final resulting conception is that of &ldquo;white men&rdquo;.</p>
"rhematic abstraction" from the corresponding instances of absolute terms.
 
  
In other words:
+
<p>Now it is perfectly apparent that if the operations above described had been performed in a converse order, the result would have been the same.  Whether we begin by forming the conception of &ldquo;''men''&rdquo;, and then by a second intellectual act limit that conception to &ldquo;white men&rdquo;, or whether we begin by forming the conception of &ldquo;white objects&rdquo;, and then limit it to such of that class as are &ldquo;men&rdquo;, is perfectly indifferent so far as the result is concerned.  It is obvious that the order of the mental processes would be equally indifferent if for the words &ldquo;white&rdquo; and &ldquo;men&rdquo; we substituted any other descriptive or appellative terms whatever, provided only that their meaning was fixed and absolute.  And thus the indifference of the order of two successive acts of the faculty of Conception, the one of which furnishes the subject upon which the other is supposed to operate, is a general condition of the exercise of that faculty.  It is a law of the mind, and it is the real origin of that law of the literal symbols of Logic which constitutes its formal expression (1) Chap. II, [&nbsp;namely, <math>xy = yx~\!</math>&nbsp;].</p>
  
1The relative term "lover of ---" can be constructed by abstracting
+
<p>It is equally clear that the mental operation above described is of such a nature that its effect is not altered by repetitionSuppose that by a definite act of conception the attention has been fixed upon men, and that by another exercise of the same faculty we limit it to those of the race who are white.  Then any further repetition of the latter mental act, by which the attention is limited to white objects, does not in any way modify the conception arrived at, viz., that of white men.  This is also an example of a general law of the mind, and it has its formal expression in the law ((2) Chap. II) of the literal symbols [&nbsp;namely, <math>x^2 = x\!</math>&nbsp;].</p>
    the absolute term "Emilia" from the absolute term "lover of Emilia".
 
    Since Iago is a lover of Emilia, the relate-correlate pair denoted
 
    by "Iago:Emilia" is a summand of the relative term "lover of ---".
 
  
2.  The relative term "betrayer to --- of ---" can be constructed
+
<p>(Boole, ''Laws of Thought'', 44&ndash;45).</p>
    by abstracting the absolute terms "Othello" and "Desdemona"
+
|}
    from the absolute term "betrayer to Othello of Desdemona".
 
    In as much as Iago is a betrayer to Othello of Desdemona,
 
    the relate-correlate-correlate triple denoted by "I:O:D"
 
    belongs to the relative term "betrayer to --- of ---".
 
  
3. The relative term "winner over of --- to --- from ---" can be constructed
+
===Commentary Note 9.2===
    by abstracting the absolute terms "Othello", "Iago", and "Cassio" from the
 
    absolute term "winner over of Othello to Iago from Cassio".  Since Iago is
 
    a winner over of Othello to Iago from Cassio, the elementary relative term
 
    "I:O:I:C" belongs to the relative term "winner over of --- to --- from ---".
 
</pre>
 
  
==Commentary Note 8.3==
+
In setting up his discussion of selective operations and their corresponding selective symbols, Boole writes this:
  
<pre>
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
Speaking very strictly, we need to be careful to
+
|
distinguish a "relation" from a "relative term".
+
<p>The operation which we really perform is one of ''selection according to a prescribed principle or idea''.  To what faculties of the mind such an operation would be referred, according to the received classification of its powers, it is not important to inquire, but I suppose that it would be considered as dependent upon the two faculties of Conception or Imagination, and Attention.  To the one of these faculties might be referred the formation of the general conception;  to the other the fixing of the mental regard upon those individuals within the prescribed universe of discourse which answer to the conception.  If, however, as seems not improbable, the power of Attention is nothing more than the power of continuing the exercise of any other faculty of the mind, we might properly regard the whole of the mental process above described as referrible to the mental faculty of Imagination or Conception, the first step of the process being the conception of the Universe itself, and each succeeding step limiting in a definite manner the conception thus formed.  Adopting this view, I shall describe each such step, or any definite combination of such steps, as a ''definite act of conception''.</p>
  
1.  The relation is an 'object' of thought
+
<p>(Boole, ''Laws of Thought'', 43).</p>
    that may be regarded "in extension" as
+
|}
    a set of ordered tuples that are known
 
    as its "elementary relations".
 
  
2.  The relative term is a 'sign' that denotes certain objects,
+
===Commentary Note 9.3===
    called its "relates", as these are determined in relation
 
    to certain other objects, called its "correlates".  Under
 
    most circumstances, one may also regard the relative term
 
    as denoting the corresponding relation.
 
  
Returning to the Othello example, let us take up the
+
In algebra, an ''idempotent element'' <math>x\!</math> is one that obeys the ''idempotent law'', that is, it satisfies the equation <math>xx = x.\!</math>  Under most circumstances, it is usual to write this as <math>x^2 = x.\!</math>
2-adic relatives "lover of ---" and "servant of ---".
 
  
Ignoring the many splendored nuances appurtenant to the idea of love,
+
If the algebraic system in question falls under the additional laws that are necessary to carry out the requisite transformations, then <math>x^2 = x\!</math> is convertible into <math>x - x^2 = 0,\!</math> and this into <math>x(1 - x) = 0.\!</math>
we may regard the relative term 'l' for "lover of ---" to be given by
 
the following equation:
 
  
'l'  = B:C +, C:B +, D:O +, E:I +, I:E +, O:D.
+
If the algebraic system in question happens to be a boolean algebra, then the equation <math>x(1 - x) = 0\!</math> says that <math>x \land \lnot x</math> is identically false, in effect, a statement of the classical principle of non-contradiction.
  
If for no better reason than to make the example more interesting,
+
We have already seen how Boole found rationales for the commutative law and the idempotent law by contemplating the properties of ''selective operations''.
let us put aside all distinctions of rank and fealty, collapsing
 
the motley crews of attendant, servant, subordinate, and so on,
 
under the heading of a single service, denoted by the relative
 
term 's' for "servant of ---". The terms of this service are:
 
  
's= C:O +, E:D +, I:O +, J:D +, J:O.
+
It is time to bring these threads together, which we can do by considering the so-called ''idempotent representation'' of sets. This will give us one of the best ways to understand the significance that Boole attached to selective operations. It will also link up with the statements that Peirce makes about his adicity-augmenting comma operation.
  
The term I:C may also be implied, but, since it is
+
===Commentary Note 9.4===
so hotly arguable, I will leave it out of the toll.
 
  
One more thing that we need to be duly wary about:
+
Boole rationalized the properties of what we now call ''boolean multiplication'', roughly equivalent to logical conjunction, in terms of the laws that apply to selective operations.  Peirce, in his turn, taking a very significant step of analysis that has seldom been recognized for what it would lead to, does not consider this multiplication to be a fundamental operation, but derives it as a by-product of relative multiplication by a comma relative.  Thus, Peirce makes logical conjunction a special case of relative composition.
There are many different conventions in the field
 
as to the ordering of terms in their applications,
 
and it happens that different conventions will be
 
more convenient under different circumstances, so
 
there does not appear to be much of a chance that
 
any one of them can be canonized once and for all.
 
  
In the current reading, we are applying relative terms
+
This opens up a very wide field of investigation, ''the operational significance of logical terms'', one might say, but it will be best to advance bit by bit, and to lean on simple examples.
from right to left, and so our conception of relative
 
multiplication, or relational composition, will need
 
to be adjusted accordingly.
 
</pre>
 
  
==Commentary Note 8.4==
+
Back to Venice, and the close-knit party of absolutes and relatives that we were entertaining when last we were there.
  
<pre>
+
Here is the list of absolute terms that we were considering before, to which I have thrown in <math>\mathbf{1},</math> the universe of ''anything'', just for good measure:
To familiarize ourselves with the forms of calculation
 
that are available in Peirce's notation, let us compute
 
a few of the simplest products that we find at hand in
 
the Othello case.
 
  
Here are the absolute terms:
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{*{17}{l}}
 +
\mathbf{1}
 +
& =      & \text{anything}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{C}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{m}
 +
& =      & \text{man}
 +
& =      & \mathrm{C}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{n}
 +
& =      & \text{noble}
 +
& =      & \mathrm{C}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{w}
 +
& =      & \text{woman}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
\end{array}</math>
 +
|}
  
1  =  B +, C +, D +, E +, I +, J +, O
+
Here is the list of ''comma inflexions'' or ''diagonal extensions'' of these terms:
  
= O
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
\mathbf{1,}
 +
& = & \text{anything that is}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = & \mathrm{B}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}
 +
\\[9pt]
 +
\mathrm{m,}
 +
& = & \text{man that is}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = & \mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}
 +
\\[9pt]
 +
\mathrm{n,}
 +
& = & \text{noble that is}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = & \mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}
 +
\\[9pt]
 +
\mathrm{w,}
 +
& = & \text{woman that is}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = & \mathrm{B}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{E}
 +
\end{array}</math>
 +
|}
  
m  =  C +, I +, J +, O
+
One observes that the diagonal extension of <math>\mathbf{1}</math> is the same thing as the identity relation <math>\mathit{1}.\!</math>
  
w  =  B +, D +, E
+
Working within our smaller sample of absolute terms, we have already computed the sorts of products that apply the diagonal extension of an absolute term to another absolute term, for instance, these products:
  
Here are the 2-adic relative terms:
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lllll}
 +
\mathrm{m},\!\mathrm{n}
 +
& = & \text{man that is noble}
 +
& = & \mathrm{C} ~+\!\!,~ \mathrm{O}
 +
\\[6pt]
 +
\mathrm{n},\!\mathrm{m}
 +
& = & \text{noble that is a man}
 +
& = & \mathrm{C} ~+\!\!,~ \mathrm{O}
 +
\\[6pt]
 +
\mathrm{w},\!\mathrm{n}
 +
& = & \text{woman that is noble}
 +
& = & \mathrm{D}
 +
\\[6pt]
 +
\mathrm{n},\!\mathrm{w}
 +
& = & \text{noble that is a woman}
 +
& = & \mathrm{D}
 +
\end{array}</math>
 +
|}
  
'l'  =  B:C +, C:B +, D:O +, E:I +, I:E +, O:D
+
This exercise gave us a bit of practical insight into why the commutative law holds for logical conjunction.
  
's'  =  C:O +, E:D +, I:O +, J:D +, J:O
+
Further insight into the laws that govern this realm of logic, and the underlying reasons why they apply, might be gained by systematically working through the whole variety of different products that are generated by the operational means in sight, namely, the products indicated by <math>\{\mathbf{1}, \mathrm{m}, \mathrm{n}, \mathrm{w} \} , \{\mathbf{1}, \mathrm{m}, \mathrm{n}, \mathrm{w} \}.</math>
  
Here are a few of the simplest products among these terms:
+
But before we try to explore this territory more systematically, let us equip our intuitions with the forms of graphical and matrical representation that served us so well in our previous adventures.
  
'l'1 = "lover of anybody"
+
===Commentary Note 9.5===
  
    = (B:C +, C:B +, D:O +, E:I +, I:E +, O:D)(B +, C +, D +, E +, I +, J +, O)
+
Peirce's comma operation, in its application to an absolute term, is tantamount to the representation of that term's denotation as an idempotent transformation, which is commonly represented as a diagonal matrix.  Hence the alternate name, ''diagonal extension''.
  
    = B +, C +, D +, E +, I +, O
+
An idempotent element <math>x\!</math> is given by the abstract condition that <math>xx = x,\!</math> but elements like these are commonly encountered in more concrete circumstances, acting as operators or transformations on other sets or spaces, and in that action they will often be represented as matrices of coefficients.
  
    = "anybody except J"
+
Let's see how this looks in the matrix and graph pictures of absolute and relative terms:
  
'l'b = "lover of a black"
+
====Absolute Terms====
  
    = (B:C +, C:B +, D:O +, E:I +, I:E +, O:D)O
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{*{17}{l}}
 +
\mathbf{1} & = & \text{anything} & = &
 +
\mathrm{B} & +\!\!, &
 +
\mathrm{C} & +\!\!, &
 +
\mathrm{D} & +\!\!, &
 +
\mathrm{E} & +\!\!, &
 +
\mathrm{I} & +\!\!, &
 +
\mathrm{J} & +\!\!, &
 +
\mathrm{O}
 +
\\[6pt]
 +
\mathrm{m} & = & \text{man} & = &
 +
\mathrm{C} & +\!\!, &
 +
\mathrm{I} & +\!\!, &
 +
\mathrm{J} & +\!\!, &
 +
\mathrm{O}
 +
\\[6pt]
 +
\mathrm{n} & = & \text{noble} & = &
 +
\mathrm{C} & +\!\!, &
 +
\mathrm{D} & +\!\!, &
 +
\mathrm{O}
 +
\\[6pt]
 +
\mathrm{w} & = & \text{woman} & = &
 +
\mathrm{B} & +\!\!, &
 +
\mathrm{D} & +\!\!, &
 +
\mathrm{E}
 +
\end{array}</math>
 +
|}
  
    = D
+
Previously, we represented absolute terms as column arrays.  The above four terms are given by the columns of the following table:
  
'l'm = "lover of a man"
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{c|cccc}
 +
\text{  } & \mathbf{1} & \mathrm{m} & \mathrm{n} & \mathrm{w} \\
 +
\text{---} & \text{---} & \text{---} & \text{---} & \text{---} \\
 +
\mathrm{B} & 1 & 0 & 0 & 1 \\
 +
\mathrm{C} & 1 & 1 & 1 & 0 \\
 +
\mathrm{D} & 1 & 0 & 1 & 1 \\
 +
\mathrm{E} & 1 & 0 & 0 & 1 \\
 +
\mathrm{I} & 1 & 1 & 0 & 0 \\
 +
\mathrm{J} & 1 & 1 & 0 & 0 \\
 +
\mathrm{O} & 1 & 1 & 1 & 0
 +
\end{array}</math>
 +
|}
  
    = (B:C +, C:B +, D:O +, E:I +, I:E +, O:D)(C +, I +, J +, O)
+
The types of graphs known as ''bigraphs'' or ''bipartite graphs'' can be used to picture simple relative terms, dyadic relations, and their corresponding logical matrices.  One way to bring absolute terms and their corresponding sets of individuals into the bigraph picture is to mark the nodes in some way, for example, hollow nodes for non-members and filled nodes for members of the indicated set, as shown below:
  
    = B +, D +, E
+
{| align="center" cellpadding="10" width="90%"
 +
| [[Image:LOR 1870 Figure 4.1.jpg]] || (4.1)
 +
|-
 +
| [[Image:LOR 1870 Figure 4.2.jpg]] || (4.2)
 +
|-
 +
| [[Image:LOR 1870 Figure 4.3.jpg]] || (4.3)
 +
|-
 +
| [[Image:LOR 1870 Figure 4.4.jpg]] || (4.4)
 +
|}
  
'l'w = "lover of a woman"
+
====Diagonal Extensions====
  
    = (B:C +, C:B +, D:O +, E:I +, I:E +, O:D)(B +, D +, E)
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
\mathbf{1,}
 +
& = & \text{anything that is}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = & \mathrm{B}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}
 +
\\[9pt]
 +
\mathrm{m,}
 +
& = & \text{man that is}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = & \mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}
 +
\\[9pt]
 +
\mathrm{n,}
 +
& = & \text{noble that is}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = & \mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}
 +
\\[9pt]
 +
\mathrm{w,}
 +
& = & \text{woman that is}\, \underline{~~ ~~}
 +
\\[6pt]
 +
& = & \mathrm{B}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{E}
 +
\end{array}</math>
 +
|}
  
    = C +, I +, O
+
Naturally enough, the diagonal extensions are represented by diagonal matrices:
  
's'1 = "servant of anybody"
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
|-
 +
|
 +
<math>\begin{array}{c|ccccccc}
 +
\mathbf{1,} &
 +
\mathrm{B}  &
 +
\mathrm{C}  &
 +
\mathrm{D}  &
 +
\mathrm{E}  &
 +
\mathrm{I}  &
 +
\mathrm{J}  &
 +
\mathrm{O}
 +
\\
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}
 +
\\
 +
\mathrm{B} & 1 &  &  &  &  &  &
 +
\\
 +
\mathrm{C} &  & 1 &  &  &  &  &
 +
\\
 +
\mathrm{D} &  &  & 1 &  &  &  &
 +
\\
 +
\mathrm{E} &  &  &  & 1 &  &  &
 +
\\
 +
\mathrm{I} &  &  &  &  & 1 &  &
 +
\\
 +
\mathrm{J} &  &  &  &  &  & 1 &
 +
\\
 +
\mathrm{O} &  &  &  &  &  &  & 1
 +
\end{array}</math>
 +
|}
  
    = (C:O +, E:D +, I:O +, J:D +, J:O)(B +, C +, D +, E +, I +, J +, O)
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
|-
 +
|
 +
<math>\begin{array}{c|ccccccc}
 +
\mathrm{m,} &
 +
\mathrm{B}  &
 +
\mathrm{C}  &
 +
\mathrm{D}  &
 +
\mathrm{E}  &
 +
\mathrm{I}  &
 +
\mathrm{J}  &
 +
\mathrm{O}
 +
\\
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}
 +
\\
 +
\mathrm{B} & 0 &  &  &  &  &  &
 +
\\
 +
\mathrm{C} &  & 1 &  &  &  &  &
 +
\\
 +
\mathrm{D} &  &  & 0 &  &  &  &
 +
\\
 +
\mathrm{E} &  &  &  & 0 &  &  &
 +
\\
 +
\mathrm{I} &  &  &  &  & 1 &  &
 +
\\
 +
\mathrm{J} &  &  &  &  &  & 1 &
 +
\\
 +
\mathrm{O} &  &  &  &  &  &  & 1
 +
\end{array}</math>
 +
|}
  
    = C +, E +, I +, J
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
|-
 +
|
 +
<math>\begin{array}{c|ccccccc}
 +
\mathrm{n,} &
 +
\mathrm{B}  &
 +
\mathrm{C}  &
 +
\mathrm{D}  &
 +
\mathrm{E}  &
 +
\mathrm{I}  &
 +
\mathrm{J}  &
 +
\mathrm{O}
 +
\\
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}
 +
\\
 +
\mathrm{B} & 0 &  &  &  &  &  &
 +
\\
 +
\mathrm{C} &  & 1 &  &  &  &  &
 +
\\
 +
\mathrm{D} &  &  & 1 &  &  &  &
 +
\\
 +
\mathrm{E} &  &  &  & 0 &  &  &
 +
\\
 +
\mathrm{I} &  &  &  &  & 0 &  &
 +
\\
 +
\mathrm{J} &  &  &  &  &  & 0 &
 +
\\
 +
\mathrm{O} &  &  &  &  &  &  & 1
 +
\end{array}</math>
 +
|}
  
's'b = "servant of a black"
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
|-
 +
|
 +
<math>\begin{array}{c|ccccccc}
 +
\mathrm{w,} &
 +
\mathrm{B}  &
 +
\mathrm{C}  &
 +
\mathrm{D}  &
 +
\mathrm{E}  &
 +
\mathrm{I}  &
 +
\mathrm{J}  &
 +
\mathrm{O}
 +
\\
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}  &
 +
\text{---}
 +
\\
 +
\mathrm{B} & 1 &  &  &  &  &  &
 +
\\
 +
\mathrm{C} &  & 0 &  &  &  &  &
 +
\\
 +
\mathrm{D} &  &  & 1 &  &  &  &
 +
\\
 +
\mathrm{E} &  &  &  & 1 &  &  &
 +
\\
 +
\mathrm{I} &  &  &  &  & 0 &  &
 +
\\
 +
\mathrm{J} &  &  &  &  &  & 0 &
 +
\\
 +
\mathrm{O} &  &  &  &  &  &  & 0
 +
\end{array}</math>
 +
|}
  
    = (C:O +, E:D +, I:O +, J:D +, J:O)O
+
Cast into the bigraph picture of dyadic relations, the diagonal extension of an absolute term takes on a very distinctive sort of &ldquo;straight-laced&rdquo; character:
  
    = C +, I +, J
+
{| align="center" cellpadding="10" width="90%"
 +
| [[Image:LOR 1870 Figure 5.1.jpg]] || (5.1)
 +
|-
 +
| [[Image:LOR 1870 Figure 5.2.jpg]] || (5.2)
 +
|-
 +
| [[Image:LOR 1870 Figure 5.3.jpg]] || (5.3)
 +
|-
 +
| [[Image:LOR 1870 Figure 5.4.jpg]] || (5.4)
 +
|}
  
's'm = "servant of a man"
+
===Commentary Note 9.6===
  
    = (C:O +, E:D +, I:O +, J:D +, J:O)(C +, I +, J +, O)
+
Just to be doggedly persistent about it, here is what ought to be a sufficient sample of products involving the multiplication of a comma relative onto an absolute term, presented in both matrix and bigraph pictures.
  
    = C +, I +, J
+
====Example 1====
  
's'w = "servant of a woman"
+
{| align="center" cellpadding="6" width="90%"
 +
| <math>\mathbf{1,}\mathbf{1} ~=~ \mathbf{1}\!</math>
 +
|-
 +
| <math>\text{anything that is anything} ~=~ \text{anything}</math>
 +
|-
 +
|
 +
<math>
 +
\begin{bmatrix}
 +
1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 1 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
</math>
 +
|}
  
    = (C:O +, E:D +, I:O +, J:D +, J:O)(B +, D +, E)
+
{| align="center" cellpadding="10" width="100%"
 +
| width="2%"  | &nbsp;
 +
| width="48%" | [[Image:LOR 1870 Figure 6.1.jpg]]
 +
| width="50%" | (6.1)
 +
|}
  
    = E +, J
+
====Example 2====
  
'ls' = "lover of a servant of ---"
+
{| align="center" cellpadding="6" width="90%"
 +
| <math>\mathbf{1,}\mathrm{m} ~=~ \mathrm{m}</math>
 +
|-
 +
| <math>\text{anything that is a man} ~=~ \text{man}</math>
 +
|-
 +
|
 +
<math>
 +
\begin{bmatrix}
 +
1 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 1 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 1 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
</math>
 +
|}
  
    = (B:C +, C:B +, D:O +, E:I +, I:E +, O:D)(C:O +, E:D +, I:O +, J:D +, J:O)
+
{| align="center" cellpadding="10" width="100%"
 +
| width="2%"  | &nbsp;
 +
| width="48%" | [[Image:LOR 1870 Figure 6.2.jpg]]
 +
| width="50%" | (6.2)
 +
|}
  
    = B:O +, E:O +, I:D
+
====Example 3====
  
'sl' = "servant of a lover of ---"
+
{| align="center" cellpadding="6" width="90%"
 +
| <math>\mathrm{m,}\mathbf{1} ~=~ \mathrm{m}</math>
 +
|-
 +
| <math>\text{man that is anything} ~=~ \text{man}</math>
 +
|-
 +
|
 +
<math>
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 1 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
</math>
 +
|}
  
    = (C:O +, E:D +, I:O +, J:D +, J:O)(B:C +, C:B +, D:O +, E:I +, I:E +, O:D)
+
{| align="center" cellpadding="10" width="100%"
 +
| width="2%"  | &nbsp;
 +
| width="48%" | [[Image:LOR 1870 Figure 6.3.jpg]]
 +
| width="50%" | (6.3)
 +
|}
  
    = C:D +, E:O +, I:D +, J:D +, J:O
+
====Example 4====
  
Among other things, one observes that the
+
{| align="center" cellpadding="6" width="90%"
relative terms 'l' and 's' do not commute,
+
| <math>\mathrm{m,}\mathrm{n} ~=~ \text{man that is noble}</math>
that is to say, 'ls' is not equal to 'sl'.
+
|-
</pre>
+
|
 +
<math>
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 1 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 1 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 1 \\ 0 \\ 0 \\ 0 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 0 \\ 0 \\ 1
 +
\end{bmatrix}
 +
</math>
 +
|}
  
==Commentary Note 8.5==
+
{| align="center" cellpadding="10" width="100%"
 +
| width="2%"  | &nbsp;
 +
| width="48%" | [[Image:LOR 1870 Figure 6.4.jpg]]
 +
| width="50%" | (6.4)
 +
|}
  
<pre>
+
====Example 5====
Since multiplication by a 2-adic relative term
 
is a logical analogue of matrix multiplication
 
in linear algebra, all of the products that we
 
computed above can be represented in terms of
 
logical matrices and logical vectors.
 
  
Here are the absolute terms again, followed by
+
{| align="center" cellpadding="6" width="90%"
their representation as "coefficient tuples",
+
| <math>\mathrm{n,}\mathrm{m} ~=~ \text{noble that is a man}</math>
otherwise thought of as "coordinate vectors".
+
|-
 +
|
 +
<math>
 +
\begin{bmatrix}
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 1 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 1 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 0
 +
\\
 +
0 & 0 & 0 & 0 & 0 & 0 & 1
 +
\end{bmatrix}
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 1 \\ 1 \\ 1
 +
\end{bmatrix}
 +
=
 +
\begin{bmatrix}
 +
0 \\ 1 \\ 0 \\ 0 \\ 0 \\ 0 \\ 1
 +
\end{bmatrix}
 +
</math>
 +
|}
  
1 = B +, C +, D +, E +, I +, J +, O
+
{| align="center" cellpadding="10" width="100%"
 +
| width="2%" | &nbsp;
 +
| width="48%" | [[Image:LOR 1870 Figure 6.5.jpg]]
 +
| width="50%" | (6.5)
 +
|}
  
  = <1, 1, 1, 1, 1, 1, 1>
+
===Commentary Note 9.7===
  
b =  O
+
From this point forward we may think of idempotents, selectives, and zero-one diagonal matrices as being roughly equivalent notions. The only reason that I say ''roughly'' is that we are comparing ideas at different levels of abstraction in proposing these connections.
  
  =  <0, 0, 0, 0, 0, 0, 1>
+
We have covered the way that Peirce uses his invention of the comma modifier to assimilate boolean multiplication, logical conjunction, and what we may think of as ''serial selection'' under his more general account of relative multiplication.
  
m = C +, I +, J +, O
+
But the comma functor has its application to relative terms of any arity, not just the zeroth arity of absolute terms, and so there will be a lot more to explore on this point. But now I must return to the anchorage of Peirce's text and hopefully get a chance to revisit this topic later.
 +
 
 +
==Selection 10==
  
  = <0, 1, 0, 0, 1, 1, 1>
+
===The Signs for Multiplication (cont.)===
  
B +, D +, E
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>The sum <math>x + x\!</math> generally denotes no logical term. But <math>{x,}_\infty + \, {x,}_\infty</math> may be considered as denoting some two <math>x\!</math>'s.</p>
  
  =  <1, 0, 1, 1, 0, 0, 0>
+
<p>It is natural to write:</p>
  
Since we are going to be regarding these tuples as "column vectors",
+
{| align="center" width="100%"
it is convenient to arrange them into a table of the following form:
+
| width="20%" | &nbsp;
 +
| width="25%" align="right" | <math>x ~+~ x</math>
 +
| width="10%" align="center"| <math>=\!</math>
 +
| width="25%" align="left"  | <math>\mathit{2}.x\!</math>
 +
| width="20%" | &nbsp;
 +
|-
 +
|
 +
|-
 +
| and
 +
| align="right"  | <math>{x,}_\infty + \, {x,}_\infty</math>
 +
| align="center" | <math>=\!</math>
 +
| align="left"  | <math>\mathit{2}.{x,}_\infty</math>
 +
| &nbsp;
 +
|}
  
  | 1 b m w
+
<p>where the dot shows that this multiplication is invertible.</p>
---o---------
 
B | 1 0 0 1
 
C | 1 0 1 0
 
D | 1 0 0 1
 
E | 1 0 0 1
 
I | 1 0 1 0
 
J | 1 0 1 0
 
O | 1 1 1 0
 
  
Here are the 2-adic relative terms again, followed by
+
<p>We may also use the antique figures so that:</p>
their representation as coefficient matrices, in this
 
case bordered by row and column labels to remind us
 
what the coefficient values are meant to signify.
 
  
'l' = B:C +, C:B +, D:O +, E:I +, I:E +, O:D =
+
{| align="center" width="100%"
 +
| width="20%" | &nbsp;
 +
| width="25%" align="right" | <math>\mathit{2}.{x,}_\infty</math>
 +
| width="10%" align="center"| <math>=\!</math>
 +
| width="25%" align="left"  | <math>\mathfrak{2}x</math>
 +
| width="20%" | &nbsp;
 +
|-
 +
|
 +
|-
 +
| just as
 +
| align="right"  | <math>\mathit{1}_\infty</math>
 +
| align="center" | <math>=\!</math>
 +
| align="left"  | <math>\mathfrak{1}</math>
 +
| &nbsp;
 +
|}
  
'l'| B C D E I J O
+
<p>Then <math>\mathfrak{2}</math> alone will denote some two things.</p>
---o---------------
 
B | 0 1 0 0 0 0 0
 
C | 1 0 0 0 0 0 0
 
D | 0 0 0 0 0 0 1
 
E | 0 0 0 0 1 0 0
 
I | 0 0 0 1 0 0 0
 
J | 0 0 0 0 0 0 0
 
O | 0 0 1 0 0 0 0
 
  
's' = C:O +, E:D +, I:O +, J:D +, J:O =
+
<p>But this multiplication is not in general commutative, and only becomes so when it affects a relative which imparts a relation such that a thing only bears it to ''one'' thing, and one thing ''alone'' bears it to a thing.</p>
  
's'| B C D E I J O
+
<p>For instance, the lovers of two women are not the same as two lovers of women, that is:</p>
---o---------------
 
B | 0 0 0 0 0 0 0
 
C | 0 0 0 0 0 0 1
 
D | 0 0 0 0 0 0 0
 
E | 0 0 1 0 0 0 0
 
I | 0 0 0 0 0 0 1
 
J | 0 0 1 0 0 0 1
 
O | 0 0 0 0 0 0 0
 
  
Here are the matrix representations of
+
{| align="center" width="100%"
the products that we calculated before:
+
| width="20%" | &nbsp;
 +
| width="25%" align="right" | <math>\mathit{l}\mathfrak{2}.\mathrm{w}</math>
 +
| width="10%" align="center"| and
 +
| width="25%" align="left"  | <math>\mathfrak{2}.\mathit{l}\mathrm{w}</math>
 +
| width="20%" | &nbsp;
 +
|}
  
'l'1 = "lover of anybody" =
+
<p>are unequal;  but the husbands of two women are the same as two husbands of women, that is:</p>
  
| 0 1 0 0 0 0 0 | | 1 |   | 1 |
+
{| align="center" width="100%"
| 1 0 0 0 0 0 0 | | 1 |   | 1 |
+
| width="20%" | &nbsp;
| 0 0 0 0 0 0 1 | | 1 |   | 1 |
+
| width="25%" align="right" | <math>\mathit{h}\mathfrak{2}.\mathrm{w}</math>
| 0 0 0 0 1 0 0 | | 1 | = | 1 |
+
| width="10%" align="center"| <math>=\!</math>
| 0 0 0 1 0 0 0 | | 1 |   | 1 |
+
| width="25%" align="left"  | <math>\mathfrak{2}.\mathit{h}\mathrm{w}</math>
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
+
| width="20%" | &nbsp;
| 0 0 1 0 0 0 0 | | 1 |  | 1 |
+
|-
 +
|
 +
|-
 +
| and in general;
 +
| align="right"  | <math>x,\!\mathfrak{2}.y</math>
 +
| align="center" | <math>=\!</math>
 +
| align="left"   | <math>\mathfrak{2}.x,\!y</math>
 +
| &nbsp;
 +
|}
  
'l'b = "lover of a black" =
+
<p>(Peirce, CP 3.75).</p>
 +
|}
  
| 0 1 0 0 0 0 0 | | 0 |  | 0 |
+
===Commentary Note 10.1===
| 1 0 0 0 0 0 0 | | 0 |  | 0 |
 
| 0 0 0 0 0 0 1 | | 0 |  | 1 |
 
| 0 0 0 0 1 0 0 | | 0 | = | 0 |
 
| 0 0 0 1 0 0 0 | | 0 |  | 0 |
 
| 0 0 0 0 0 0 0 | | 0 |  | 0 |
 
| 0 0 1 0 0 0 0 | | 1 |  | 0 |
 
  
'l'm = "lover of a man" =
+
What Peirce is attempting to do in CP 3.75 is absolutely amazing and I personally did not see anything on par with it again until I began to study the application of mathematical category theory to computation and logic, back in the mid 1980's.  To completely evaluate the success of this attempt we would have to return to Peirce's earlier paper &ldquo;Upon the Logic of Mathematics&rdquo; (1867) to pick up some of the ideas about arithmetic that he set out there.
  
| 0 1 0 0 0 0 0 | | 0 |  | 1 |
+
Another branch of the investigation would require that we examine more carefully the entire syntactic mechanics of ''subjacent signs'' that Peirce uses to establish linkages among relational domains.  It is important to note that these types of indices constitute a diacritical, interpretive, syntactic category under which Peirce also places the comma functor.
| 1 0 0 0 0 0 0 | | 1 |  | 0 |
 
| 0 0 0 0 0 0 1 | | 0 |  | 1 |
 
| 0 0 0 0 1 0 0 | | 0 | = | 1 |
 
| 0 0 0 1 0 0 0 | | 1 |  | 0 |
 
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
 
| 0 0 1 0 0 0 0 | | 1 |  | 0 |
 
  
'l'w = "lover of a woman" =
+
The way that I would currently approach both of these branches of the investigation would be to open up a wider context for the study of relational compositions, attempting to get at the essence of what is going on when we relate relations, possibly complex, to other relations, possibly simple.
  
| 0 1 0 0 0 0 0 | | 1 |  | 0 |
+
===Commentary Note 10.2===
| 1 0 0 0 0 0 0 | | 0 |  | 1 |
 
| 0 0 0 0 0 0 1 | | 1 |  | 0 |
 
| 0 0 0 0 1 0 0 | | 1 | = | 0 |
 
| 0 0 0 1 0 0 0 | | 0 |  | 1 |
 
| 0 0 0 0 0 0 0 | | 0 |  | 0 |
 
| 0 0 1 0 0 0 0 | | 0 |  | 1 |
 
  
's'1 = "servant of anybody" =
+
To say that a relative term &ldquo;imparts a relation&rdquo; is to say that it conveys information about the space of tuples in a cartesian product, that is, it determines a particular subset of that space.  When we study the combinations of relative terms, from the most elementary forms of composition to the most complex patterns of correlation, we are considering the ways that these constraints, determinations, and informations, as imparted by relative terms, can be compounded in the formation of syntax.
  
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
+
Let us go back and look more carefully at just how it happens that Peirce's adjacent terms and subjacent indices manage to impart their respective measures of information about relations.  I will begin with the two examples illustrated in Figures&nbsp;7 and 8, where I have drawn in the corresponding lines of identity between the subjacent marks of reference:  <math>\dagger, \ddagger, \parallel, \S, \P.\!</math>
| 0 0 0 0 0 0 1 | | 1 |  | 1 |
 
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
 
| 0 0 1 0 0 0 0 | | 1 | = | 1 |
 
| 0 0 0 0 0 0 1 | | 1 |  | 1 |
 
| 0 0 1 0 0 0 1 | | 1 |  | 1 |
 
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
 
  
's'b = "servant of a black" =
+
<br>
  
| 0 0 0 0 0 0 0 | | 0 |  | 0 |
+
{| align="center" cellpadding="10"
| 0 0 0 0 0 0 1 | | 0 |  | 1 |
+
| [[Image:LOR 1870 Figure 7.0.jpg]] || (7)
| 0 0 0 0 0 0 0 | | 0 |  | 0 |
+
|}
| 0 0 1 0 0 0 0 | | 0 | = | 0 |
 
| 0 0 0 0 0 0 1 | | 0 |  | 1 |
 
| 0 0 1 0 0 0 1 | | 0 |  | 1 |
 
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
 
  
's'm = "servant of a man" =
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 8.0.jpg]] || (8)
 +
|}
  
| 0 0 0 0 0 0 0 | | 0 |  | 0 |
+
One way to approach the problem of &ldquo;information fusion&rdquo; in Peirce's syntax is to soften the distinction between adjacent terms and subjacent signs and to treat the types of constraints that they separately signify more on a par with each other.  To that purpose, I will set forth a way of thinking about relational composition that emphasizes the set-theoretic constraints involved in the construction of a composite.
| 0 0 0 0 0 0 1 | | 1 |  | 1 |
 
| 0 0 0 0 0 0 0 | | 0 |  | 0 |
 
| 0 0 1 0 0 0 0 | | 0 | = | 0 |
 
| 0 0 0 0 0 0 1 | | 1 |  | 1 |
 
| 0 0 1 0 0 0 1 | | 1 |  | 1 |
 
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
 
  
's'w = "servant of a woman" =
+
For example, suppose that we are given the relations <math>L \subseteq X \times Y</math> and <math>M \subseteq Y \times Z.</math>  Table&nbsp;9 and Figure&nbsp;10 present two ways of picturing the constraints that are involved in constructing the relational composition <math>L \circ M \subseteq X \times Z.</math>
  
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
+
<br>
| 0 0 0 0 0 0 1 | | 0 |  | 0 |
 
| 0 0 0 0 0 0 0 | | 1 |  | 0 |
 
| 0 0 1 0 0 0 0 | | 1 | = | 1 |
 
| 0 0 0 0 0 0 1 | | 0 |  | 0 |
 
| 0 0 1 0 0 0 1 | | 0 |  | 1 |
 
| 0 0 0 0 0 0 0 | | 0 |  | 0 |
 
  
'ls' = "lover of a servant of ---" =
+
{| align="center" cellpadding="10" cellspacing="0" style="border-left:1px solid black; border-top:1px solid black; border-right:1px solid black; border-bottom:1px solid black; text-align:center; width:60%"
 +
|+ style="height:30px" | <math>\text{Table 9.} ~~ \text{Relational Composition}\!</math>
 +
|-
 +
| style="border-right:1px solid black; border-bottom:1px solid black; width:25%" | &nbsp;
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>L\!</math>
 +
| <math>X\!</math>
 +
| <math>Y\!</math>
 +
| &nbsp;
 +
|-
 +
| style="border-right:1px solid black" | <math>M\!</math>
 +
| &nbsp;
 +
| <math>Y\!</math>
 +
| <math>Z\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>L \circ M\!</math>
 +
| <math>X\!</math>
 +
| &nbsp;
 +
| <math>Z\!</math>
 +
|}
  
| 0 1 0 0 0 0 0 | | 0 0 0 0 0 0 0 |  | 0 0 0 0 0 0 1 |
+
<br>
| 1 0 0 0 0 0 0 | | 0 0 0 0 0 0 1 |  | 0 0 0 0 0 0 0 |
 
| 0 0 0 0 0 0 1 | | 0 0 0 0 0 0 0 |  | 0 0 0 0 0 0 0 |
 
| 0 0 0 0 1 0 0 | | 0 0 1 0 0 0 0 | = | 0 0 0 0 0 0 1 |
 
| 0 0 0 1 0 0 0 | | 0 0 0 0 0 0 1 |  | 0 0 1 0 0 0 0 |
 
| 0 0 0 0 0 0 0 | | 0 0 1 0 0 0 1 |  | 0 0 0 0 0 0 0 |
 
| 0 0 1 0 0 0 0 | | 0 0 0 0 0 0 0 |  | 0 0 0 0 0 0 0 |
 
  
'sl' = "servant of a lover of ---" =
+
The way to read Table&nbsp;9 is to imagine that you are playing a game that involves placing tokens on the squares of a board that is marked in just this way.  The rules are that you have to place a single token on each marked square in the middle of the board in such a way that all of the indicated constraints are satisfied.  That is to say, you have to place a token whose denomination is a value in the set <math>X\!</math> on each of the squares marked <math>{}^{\backprime\backprime} X {}^{\prime\prime},</math> and similarly for the squares marked <math>{}^{\backprime\backprime} Y {}^{\prime\prime}</math> and <math>{}^{\backprime\backprime} Z {}^{\prime\prime},</math> meanwhile leaving all of the blank squares empty.  Furthermore, the tokens placed in each row and column have to obey the relational constraints that are indicated at the heads of the corresponding row and column.  Thus, the two tokens from <math>X\!</math> have to denominate the very same value from <math>X,\!</math> and likewise for <math>Y\!</math> and <math>Z,\!</math> while the pairs of tokens on the rows marked <math>{}^{\backprime\backprime} L {}^{\prime\prime}</math> and <math>{}^{\backprime\backprime} M {}^{\prime\prime}</math> are required to denote elements that are in the relations <math>L\!</math> and <math>M,\!</math> respectively.  The upshot is that when just this much is done, that is, when the <math>L,\!</math> <math>M,\!</math> and <math>\mathit{1}\!</math> relations are satisfied, then the row marked <math>{}^{\backprime\backprime} L \circ M {}^{\prime\prime}</math> will automatically bear the tokens of a pair of elements in the composite relation <math>L \circ M.\!</math>
  
| 0 0 0 0 0 0 0 | | 0 1 0 0 0 0 0 |  | 0 0 0 0 0 0 0 |
+
Figure&nbsp;10 shows a different way of viewing the same situation.
| 0 0 0 0 0 0 1 | | 1 0 0 0 0 0 0 |  | 0 0 1 0 0 0 0 |
 
| 0 0 0 0 0 0 0 | | 0 0 0 0 0 0 1 |  | 0 0 0 0 0 0 0 |
 
| 0 0 1 0 0 0 0 | | 0 0 0 0 1 0 0 | = | 0 0 0 0 0 0 1 |
 
| 0 0 0 0 0 0 1 | | 0 0 0 1 0 0 0 |  | 0 0 1 0 0 0 0 |
 
| 0 0 1 0 0 0 1 | | 0 0 0 0 0 0 0 |  | 0 0 1 0 0 0 1 |
 
| 0 0 0 0 0 0 0 | | 0 0 1 0 0 0 0 |  | 0 0 0 0 0 0 0 |
 
</pre>
 
  
==Commentary Note 8.6==
+
<br>
  
<pre>
+
{| align="center" cellpadding="10"
The foregoing has hopefully filled in enough background that we
+
| [[Image:LOR 1870 Figure 10.jpg]] || (10)
can begin to make sense of the more mysterious parts of CP 3.73.
+
|}
  
| Thus far, we have considered the multiplication of relative terms only.
+
===Commentary Note 10.3===
| Since our conception of multiplication is the application of a relation,
 
| we can only multiply absolute terms by considering them as relatives.
 
|
 
| Now the absolute term "man" is really exactly equivalent to
 
| the relative term "man that is ---", and so with any other.
 
| I shall write a comma after any absolute term to show that
 
| it is so regarded as a relative term.
 
|
 
| Then:
 
|
 
| "man that is black"
 
|
 
| will be written
 
|
 
| m,b.
 
|
 
| C.S. Peirce, CP 3.73
 
  
In any system where elements are organized according to types,
+
I will devote some time to drawing out the relationships that exist among the different pictures of relations and relative terms that were shown above, or as redrawn here:
there tend to be any number of ways in which elements of one
 
type are naturally associated with elements of another type.
 
If the association is anything like a logical equivalence,
 
but with the first type being "lower" and the second type
 
being "higher" in some sense, then one frequently speaks
 
of a "semantic ascent" from the lower to the higher type.
 
  
For instance, it is very common in mathematics to associate an element m
+
<br>
of a set M with the constant function f_m : X -> M such that f_m (x) = m
 
for all x in X, where X is an arbitrary set.  Indeed, the correspondence
 
is so close that one often uses the same name "m" for the element m in M
 
and the function m = f_m : X -> M, relying on the context or an explicit
 
type indication to tell them apart.
 
  
For another instance, we have the "tacit extension" of a k-place relation
+
{| align="center" cellpadding="10"
L c X_1 x ... x X_k to a (k+1)-place relation L' c X_1 x ... x X_k+1 that
+
| [[Image:LOR 1870 Figure 7.0.jpg]] || (11)
we get by letting L' = L x X_k+1, that is, by maintaining the constraints
+
|}
of L on the first k variables and letting the last variable wander freely.
 
  
What we have here, if I understand Peirce correctly, is another such
+
{| align="center" cellpadding="10"
type of natural extension, sometimes called the "diagonal extension".
+
| [[Image:LOR 1870 Figure 8.0.jpg]] || (12)
This associates a k-adic relative or a k-adic relation, counting the
+
|}
absolute term and the set whose elements it denotes as the cases for
 
k = 0, with a series of relatives and relations of higher adicities.
 
  
A few examples will suffice to anchor these ideas.
+
Figures&nbsp;11 and 12 present examples of relative multiplication in one of the styles of syntax that Peirce used, to which I added lines of identity to connect the corresponding marks of reference.  These pictures are adapted to showing the anatomy of relative terms, while the forms of analysis illustrated in Table&nbsp;13 and Figure&nbsp;14 are designed to highlight the structures of the objective relations themselves.
  
Absolute terms:
+
<br>
  
= "man"               = C +, I +, J +, O
+
{| align="center" cellpadding="10" cellspacing="0" style="border-left:1px solid black; border-top:1px solid black; border-right:1px solid black; border-bottom:1px solid black; text-align:center; width:60%"
 +
|+ style="height:30px" | <math>\text{Table 13.} ~~ \text{Relational Composition}\!</math>
 +
|-
 +
| style="border-right:1px solid black; border-bottom:1px solid black; width:25%" | &nbsp;
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>L\!</math>
 +
| <math>X\!</math>
 +
| <math>Y\!</math>
 +
| &nbsp;
 +
|-
 +
| style="border-right:1px solid black" | <math>S\!</math>
 +
| &nbsp;
 +
| <math>Y\!</math>
 +
| <math>Z\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>L \circ S\!</math>
 +
| <math>X\!</math>
 +
| &nbsp;
 +
| <math>Z\!</math>
 +
|}
  
n  =  "noble"              =  C +, D +, O
+
<br>
  
= "woman"             = B +, D +, E
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 14.jpg]] || (14)
 +
|}
  
Diagonal extensions:
+
There are many ways that Peirce might have gotten from his 1870 Notation for the Logic of Relatives to his more evolved systems of Logical Graphs.  It is interesting to speculate on how the metamorphosis might have been accomplished by way of transformations that act on these nascent forms of syntax and that take place not too far from the pale of its means, that is, as nearly as possible according to the rules and the permissions of the initial system itself.
  
m, =  "man that is ---"    =  C:C +, I:I +, J:J +, O:O
+
In Existential Graphs, a relation is represented by a node whose degree is the adicity of that relation, and which is adjacent via lines of identity to the nodes that represent its correlative relations, including as a special case any of its terminal individual arguments.
  
n, =  "noble that is ---" =  C:C +, D:D +, O:O
+
In the 1870 Logic of Relatives, implicit lines of identity are invoked by the subjacent numbers and marks of reference only when a correlate of some relation is the relate of some relation. Thus, the principal relate, which is not a correlate of any explicit relation, is not singled out in this way.
  
w, =  "woman that is ---"  =  B:B +, D:D +, E:E
+
Remarkably enough, the comma modifier itself provides us with a mechanism to abstract the logic of relations from the logic of relatives, and thus to forge a possible link between the syntax of relative terms and the more graphical depiction of the objective relations themselves.
  
Sample products:
+
Figure&nbsp;15 demonstrates this possibility, posing a transitional case between the style of syntax in Figure&nbsp;11 and the picture of composition in Figure&nbsp;14.
  
m,n  =  "man that is noble" 
+
<br>
  
    = (C:C +, I:I +, J:J +, O:O)(C +, D +, O)
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 15.jpg]] || (15)
 +
|}
  
    = C +, O
+
In this composite sketch the diagonal extension <math>\mathit{1}\!</math> of the universe <math>\mathbf{1}\!</math> is invoked up front to anchor an explicit line of identity for the leading relate of the composition, while the terminal argument <math>\mathrm{w}\!</math> has been generalized to the whole universe <math>\mathbf{1},\!</math> in effect, executing an act of abstraction. This type of universal bracketing isolates the composing of the relations <math>L\!</math> and <math>S\!</math> to form the composite <math>L \circ S.\!</math>  The three relational domains <math>X, Y, Z\!</math> may be distinguished from one another, or else rolled up into a single universe of discourse, as one prefers.
  
n,m  = "noble that is man"
+
===Commentary Note 10.4===
  
    = (C:C +, D:D +, O:O)(C +, I +, J +, O)
+
From now on I will use the forms of analysis exemplified in the last set of Figures and Tables as a routine bridge between the logic of relative terms and the logic of their extended relations. For future reference, we may think of Table&nbsp;13 as illustrating the ''spreadsheet'' model of relational composition, while Figure&nbsp;14 may be thought of as making a start toward a ''hypergraph'' model of generalized compositions.  I will explain the hypergraph model in some detail at a later point.  The transitional form of analysis represented by Figure&nbsp;15 may be called the ''universal bracketing'' of relatives as relations.
  
    = C +, O
+
===Commentary Note 10.5===
  
n,w  =  "noble that is woman"
+
We have sufficiently covered the application of the comma functor, or the diagonal extension, to absolute terms, so let us return to where we were in working our way through CP&nbsp;3.73 and see whether we can validate Peirce's statements about the &ldquo;commifications&rdquo; of 2-adic relative terms that yield their 3-adic diagonal extensions.
  
    (C:C +, D:D +, O:O)(B +, D +, E)
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>But not only may any absolute term be thus regarded as a relative term, but any relative term may in the same way be regarded as a relative with one correlate more. It is convenient to take this additional correlate as the first one.</p>
  
    = D
+
<p>Then:</p>
 +
|-
 +
| align="center" | <math>\mathit{l},\!\mathit{s}\mathrm{w}</math>
 +
|-
 +
|
 +
<p>will denote a lover of a woman that is a servant of that woman.</p>
  
w,n  =  "woman that is noble"
+
<p>The comma here after <math>\mathit{l}\!</math> should not be considered as altering at all the meaning of <math>\mathit{l}\!</math>, but as only a subjacent sign, serving to alter the arrangement of the correlates.</p>
  
    =  (B:B +, D:D +, E:E)(C +, D +, O)
+
<p>(Peirce, CP 3.73).</p>
 +
|}
  
    = D
+
Just to plant our feet on a more solid stage, let's apply this idea to the Othello example. For this performance only, just to make the example more interesting, let us assume that <math>\mathrm{Jeste ~ (J)}\!</math> is secretly in love with <math>\mathrm{Desdemona ~ (D)}.\!</math>
</pre>
 
  
==Selection 9==
+
Then we begin with the modified data set:
  
<pre>
+
{| align="center" cellspacing="6" width="90%"
| The Signs for Multiplication (cont.)
 
 
|
 
|
| It is obvious that multiplication into
+
<math>\begin{array}{*{15}{c}}
| a multiplicand indicated by a comma is
+
\mathrm{w}
| commutative <1>, that is,
+
& =      & \mathrm{B}
|
+
& +\!\!, & \mathrm{D}
| 's','l'  =  'l','s'.
+
& +\!\!, & \mathrm{E}
|
+
\\[6pt]
| This multiplication is effectively the same as
+
\mathit{l}
| that of Boole in his logical calculus.  Boole's
+
& =      & \mathrm{B}\!:\!\mathrm{C}
| unity is my 1, that is, it denotes whatever is.
+
& +\!\!, & \mathrm{C}\!:\!\mathrm{B}
|
+
& +\!\!, & \mathrm{D}\!:\!\mathrm{O}
| <1>.  It will often be convenient to speak of the whole operation of
+
& +\!\!, & \mathrm{E}\!:\!\mathrm{I}
| affixing a comma and then multiplying as a commutative multiplication,
+
& +\!\!, & \mathrm{I}\!:\!\mathrm{E}
| the sign for which is the comma.  But though this is allowable, we shall
+
& +\!\!, & \mathrm{J}\!:\!\mathrm{D}
| fall into confusion at once if we ever forget that in point of fact it is
+
& +\!\!, & \mathrm{O}\!:\!\mathrm{D}
| not a different multiplication, only it is multiplication by a relative
+
\\[6pt]
| whose meaning -- or rather whose syntax -- has been slightly altered;
+
\mathit{s}
| and that the comma is really the sign of this modification of the
+
& =      & \mathrm{C}\!:\!\mathrm{O}
| foregoing term.
+
& +\!\!, & \mathrm{E}\!:\!\mathrm{D}
|
+
& +\!\!, & \mathrm{I}\!:\!\mathrm{O}
| C.S. Peirce, CP 3.74
+
& +\!\!, & \mathrm{J}\!:\!\mathrm{D}
|
+
& +\!\!, & \mathrm{J}\!:\!\mathrm{O}
| Charles Sanders Peirce,
+
\end{array}</math>
|"Description of a Notation for the Logic of Relatives,
+
|}
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
</pre>
 
  
==Commentary Note 9.1==
+
And next we derive the following results:
 
 
<pre>
 
Let us backtrack a few years, and consider how Boole explained his
 
twin conceptions of "selective operations" and "selective symbols".
 
  
| Let us then suppose that the universe of our discourse
+
{| align="center" cellspacing="6" width="90%"
| is the actual universe, so that words are to be used in
 
| the full extent of their meaning, and let us consider the
 
| two mental operations implied by the words "white" and "men".
 
| The word "men" implies the operation of selecting in thought
 
| from its subject, the universe, all men;  and the resulting
 
| conception, 'men', becomes the subject of the next operation.
 
| The operation implied by the word "white" is that of selecting
 
| from its subject, "men", all of that class which are white.
 
| The final resulting conception is that of "white men".
 
|
 
| Now it is perfectly apparent that if the operations above described
 
| had been performed in a converse order, the result would have been the
 
| same.  Whether we begin by forming the conception of "'men'", and then by
 
| a second intellectual act limit that conception to "white men", or whether
 
| we begin by forming the conception of "white objects", and then limit it to
 
| such of that class as are "men", is perfectly indifferent so far as the result
 
| is concerned.  It is obvious that the order of the mental processes would be
 
| equally indifferent if for the words "white" and "men" we substituted any
 
| other descriptive or appellative terms whatever, provided only that their
 
| meaning was fixed and absolute.  And thus the indifference of the order
 
| of two successive acts of the faculty of Conception, the one of which
 
| furnishes the subject upon which the other is supposed to operate,
 
| is a general condition of the exercise of that faculty.  It is
 
| a law of the mind, and it is the real origin of that law of
 
| the literal symbols of Logic which constitutes its formal
 
| expression (1) Chap. II, [namely, xy = yx].
 
|
 
| It is equally clear that the mental operation above described is of such
 
| a nature that its effect is not altered by repetition.  Suppose that by
 
| a definite act of conception the attention has been fixed upon men, and
 
| that by another exercise of the same faculty we limit it to those of the
 
| race who are white.  Then any further repetition of the latter mental act,
 
| by which the attention is limited to white objects, does not in any way
 
| modify the conception arrived at, viz., that of white men.  This is also
 
| an example of a general law of the mind, and it has its formal expression
 
| in the law ((2) Chap. II) of the literal symbols [namely, x^2 = x].
 
|
 
| Boole, 'Laws of Thought', pp. 44-45.
 
 
|
 
|
| George Boole,
+
<math>\begin{array}{l}
|'An Investigation of the Laws of Thought,
+
\mathit{l}, ~=
| On Which are Founded the Mathematical
+
\\[6pt]
| Theories of Logic and Probabilities',
+
\text{lover that is}\, \underline{~~ ~~}\, \text{of}\, \underline{~~ ~~} ~=
| Reprinted, Dover, New York, NY, 1958.
+
\\[6pt]
| Originally published, Macmillan, 1854.
+
(\mathrm{B}\!:\!\mathrm{B}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{C}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{E}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{D})
</pre>
+
\\[12pt]
 +
\mathit{l},\!\mathit{s}\mathrm{w} ~=
 +
\\[6pt]
 +
(\mathrm{B}\!:\!\mathrm{B}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{C}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{E}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{D})
 +
\\
 +
\times
 +
\\
 +
(\mathrm{C}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{O} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{O})
 +
\\
 +
\times
 +
\\
 +
(\mathrm{B} ~+\!\!,~ \mathrm{D} ~+\!\!,~ \mathrm{E})
 +
\end{array}</math>
 +
|}
  
==Commentary Note 9.2==
+
Now what are we to make of that?
  
<pre>
+
If we operate in accordance with Peirce's example of <math>\mathfrak{g}\mathit{o}\mathrm{h}</math> as the &ldquo;giver of a horse to an owner of that horse&rdquo;, then we may assume that the associative law and the distributive law are in force, allowing us to derive this equation:
In setting up his discussion of selective operations and
 
their corresponding selective symbols, Boole writes this:
 
  
| The operation which we really perform is one of 'selection according to
+
{| align="center" cellspacing="6" width="90%"
| a prescribed principle or idea'.  To what faculties of the mind such an
 
| operation would be referred, according to the received classification of
 
| its powers, it is not important to inquire, but I suppose that it would be
 
| considered as dependent upon the two faculties of Conception or Imagination,
 
| and Attention.  To the one of these faculties might be referred the formation
 
| of the general conception;  to the other the fixing of the mental regard upon
 
| those individuals within the prescribed universe of discourse which answer to
 
| the conception.  If, however, as seems not improbable, the power of Attention
 
| is nothing more than the power of continuing the exercise of any other faculty
 
| of the mind, we might properly regard the whole of the mental process above
 
| described as referrible to the mental faculty of Imagination or Conception,
 
| the first step of the process being the conception of the Universe itself,
 
| and each succeeding step limiting in a definite manner the conception
 
| thus formed.  Adopting this view, I shall describe each such step,
 
| or any definite combination of such steps, as a 'definite act
 
| of conception'.
 
 
|
 
|
| Boole, 'Laws of Thought', p. 43.
+
<math>\begin{array}{lll}
|
+
\mathit{l},\!\mathit{s}\mathrm{w}
| George Boole,
+
& = &
|'An Investigation of the Laws of Thought,
+
\mathit{l},\!\mathit{s}(\mathrm{B} ~~+\!\!,~~ \mathrm{D} ~~+\!\!,~~ \mathrm{E})
| On Which are Founded the Mathematical
+
\\[6pt]
| Theories of Logic and Probabilities',
+
& = &
| Reprinted, Dover, New York, NY, 1958.
+
\mathit{l},\!\mathit{s}\mathrm{B} ~~+\!\!,~~ \mathit{l},\!\mathit{s}\mathrm{D} ~~+\!\!,~~ \mathit{l},\!\mathit{s}\mathrm{E}
| Originally published, Macmillan, 1854.
+
\end{array}</math>
</pre>
+
|}
  
==Commentary Note 9.3==
+
Evidently what Peirce means by the associative principle, as it applies to this type of product, is that a product of elementary relatives having the form <math>(\mathrm{R}\!:\!\mathrm{S}\!:\!\mathrm{T})(\mathrm{S}\!:\!\mathrm{T})(\mathrm{T})\!</math> is equal to <math>\mathrm{R}\!</math> but that no other form of product yields a non-null result.  Scanning the implied terms of the triple product tells us that only the case <math>(\mathrm{J}\!:\!\mathrm{J}\!:\!\mathrm{D})(\mathrm{J}\!:\!\mathrm{D})(\mathrm{D}) = \mathrm{J}\!</math> is non-null.
  
<pre>
+
It follows that:
In algebra, an "idempotent element" x is one that obeys the
 
"idempotent law", that is, it satisfies the equation xx = x.
 
Under most circumstances, it is usual to write this x^2 = x.
 
  
If the algebraic system in question falls under the additional laws
+
{| align="center" cellspacing="6" width="90%"
that are necessary to carry out the requisite transformations, then
+
|
x^2 = x is convertible into x - x^2 = 0, and this into x(1 - x) = 0.
+
<math>\begin{array}{lll}
 +
\mathit{l},\!\mathit{s}\mathrm{w}
 +
& = &
 +
\text{lover and servant of a woman}
 +
\\[6pt]
 +
& = &
 +
\text{lover that is a servant of a woman}
 +
\\[6pt]
 +
& = &
 +
\text{lover of a woman that is a servant of that woman}
 +
\\[6pt]
 +
& = &
 +
\mathrm{J}
 +
\end{array}</math>
 +
|}
  
If the algebraic system in question happens to be a boolean algebra,
+
And so what Peirce says makes sense in this case.
then the equation x(1 - x) = 0 says that x & ~x is identically false,
 
in effect, a statement of the classical principle of non-contradiction.
 
  
We have already seen how Boole found rationales for the commutative law and
+
===Commentary Note 10.6===
the idempotent law by contemplating the properties of "selective operations".
 
  
It is time to bring these threads together, which we can do by considering the
+
As Peirce observes, it is not possible to work with relations in general without eventually abandoning all of one's algebraic principles, in due time the associative law and maybe even the distributive law, just as we already gave up the commutative law.  It cannot be helped, as we cannot reflect on a law if not from a perspective outside it, at any rate, virtually so.
so-called "idempotent representation" of sets.  This will give us one of the
 
best ways to understand the significance that Boole attached to selective
 
operations.  It will also link up with the statements that Peirce makes
 
about his adicity-augmenting comma operation.
 
</pre>
 
  
==Commentary Note 9.4==
+
This could be done from the standpoint of the combinator calculus, and there are places where Peirce verges on systems that are very similar, but here we are making a deliberate effort to stay within the syntactic neighborhood of Peirce's 1870 Logic of Relatives.  Not too coincidentally, it is for the sake of making smoother transitions between narrower and wider regimes of algebraic law that we have been developing the paradigm of Figures and Tables indicated above.
  
<pre>
+
For the next few episodes, then, I will examine the examples that Peirce gives at the next level of complication in the multiplication of relative terms, for example, the three that are repeated below.
Boole rationalized the properties of what we now dub "boolean multiplication",
 
roughly equivalent to logical conjunction, in terms of the laws that apply to
 
selective operations.  Peirce, in his turn, taking a very significant step of
 
analysis that has seldom been recognized for what it would lead to, much less
 
followed, does not consider this multiplication to be a fundamental operation,
 
but derives it as a by-product of relative multiplication by a comma relative.
 
Thus, Peirce makes logical conjunction a special case of relative composition.
 
  
This opens up a very wide field of investigation,
+
{| align="center" cellpadding="10"
"the operational significance of logical terms",
+
| [[Image:LOR 1870 Figure 8.0.jpg]] || (16)
one might say, but it will be best to advance
+
|}
bit by bit, and to lean on simple examples.
 
  
Back to Venice, and the close-knit party
+
{| align="center" cellpadding="10"
of absolutes and relatives that we were
+
| [[Image:LOR 1870 Figure 17.0.jpg]] || (17)
entertaining when last we were there.
+
|}
  
Here is the list of absolute terms that we were considering before,
+
{| align="center" cellpadding="10"
to which I have thrown in 1, the universe of "anybody or anything",
+
| [[Image:LOR 1870 Figure 18.jpg]] || (18)
just for good measure:
+
|}
  
= "anybody"              = B +, C +, D +, E +, I +, J +, O
+
===Commentary Note 10.7===
  
m  =  "man"                  =  C +, I +, J +, O
+
Here is what I get when I try to analyze Peirce's &ldquo;giver of a horse to a lover of a woman&rdquo; example along the same lines as the dyadic compositions.
  
n  =  "noble"                =  C +, D +, O
+
We may begin with the mark-up shown in Figure&nbsp;19.
  
= "woman"               = B +, D +, E
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 8.0.jpg]] || (19)
 +
|}
  
Here is the list of "comma inflexions" or "diagonal extensions" of these terms:
+
If we analyze this in accord with the spreadsheet model of relational composition, the core of it is a particular way of composing a triadic ''giving'' relation <math>G \subseteq T \times U \times V\!</math> with a dyadic ''loving'' relation <math>L \subseteq U \times W\!</math> so as to obtain a specialized sort of triadic relation <math>(G \circ L) \subseteq T \times V \times W.\!</math>  The applicable constraints on tuples are shown in Table&nbsp;20.
  
1,  =  "anybody that is ---"  =  B:B +, C:C +, D:D +, E:E +, I:I +, J:J +, O:O
+
<br>
  
m,  = "man that is ---"     = C:C +, I:I +, J:J +, O:O
+
{| align="center" cellpadding="10" cellspacing="0" style="border-left:1px solid black; border-top:1px solid black; border-right:1px solid black; border-bottom:1px solid black; text-align:center; width:75%"
 +
|+ style="height:30px" | <math>\text{Table 20.} ~~ \text{Composite of Triadic and Dyadic Relations}\!</math>
 +
|-
 +
| style="border-right:1px solid black; border-bottom:1px solid black; width:20%" | &nbsp;
 +
| style="border-bottom:1px solid black; width:20%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:20%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:20%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:20%" | <math>\mathit{1}\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>G\!</math>
 +
| <math>T\!</math>
 +
| <math>U\!</math>
 +
| <math>V\!</math>
 +
| &nbsp;
 +
|-
 +
| style="border-right:1px solid black" | <math>L\!</math>
 +
| &nbsp;
 +
| <math>U\!</math>
 +
| &nbsp;
 +
| <math>W\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>G \circ L</math>
 +
| <math>T\!</math>
 +
| &nbsp;
 +
| <math>V\!</math>
 +
| <math>W\!</math>
 +
|}
  
n,  =  "noble that is ---"    =  C:C +, D:D +, O:O
+
<br>
  
w,  =  "woman that is ---"    =  B:B +, D:D +, E:E
+
The hypergraph picture of the abstract composition is given in Figure&nbsp;21.
  
One observes that the diagonal extension of 1
+
{| align="center" cellpadding="10"
is the same thing as the identity relation !1!.
+
| [[Image:LOR 1870 Figure 21.jpg]] || (21)
 +
|}
  
Inspired by this identification of "1," with "!1!", and because
+
===Commentary Note 10.8===
the affixed commas of the diagonal extensions tend to get lost
 
in the ordinary commas of punctuation, I will experiment with
 
using the alternative notations:
 
  
m,  =  !m!
+
There's a critical transition point in sight of Peirce's 1870 Logic of Relatives and it's a point that turns on the teridentity relation.
n,  =  !n!
 
w,  =  !w!
 
  
Working within our smaller sample of absolute terms,
+
In taking up the next example of relational composition, let's substitute the relation <math>\mathit{t} = \text{taker of}\, \underline{~~ ~~}\!</math> for Peirce's relation <math>\mathit{o} = \text{owner of}\, \underline{~~ ~~},\!</math> simply for the sake of avoiding conflicts in the symbols we use.  In this way, Figure&nbsp;17 is transformed into Figure&nbsp;22.
we have already computed the sorts of products that
 
apply the diagonal extension of an absolute term to
 
another absolute term, for instance, these products:
 
  
m,n  = !m!n  =  "man that is noble"   =  C +, O
+
{| align="center" cellpadding="10"
n,m  =  !n!m  = "noble that is man"   =  C +, O
+
| [[Image:LOR 1870 Figure 22.jpg]] || (22)
n,w  =  !n!w  =  "noble that is woman"  =  D
+
|}
w,n  =  !w!n  =  "woman that is noble"  =  D
 
  
This exercise gave us a bit of practical insight into
+
The hypergraph picture of the abstract composition is given in Figure&nbsp;23.
why the commutative law holds for logical conjunction.
 
  
Further insight into the laws that govern this realm of logic,
+
{| align="center" cellpadding="10"
and the underlying reasons why they apply, might be gained by
+
| [[Image:LOR 1870 Figure 23.jpg]] || (23)
systematically working through the whole variety of different
+
|}
products that are generated by the operational means in sight,
 
namely, the products indicated by {1, m, n, w}<,>{1, m, n, w}.
 
  
But before we try to explore this territory more systematically,
+
If we analyze this in accord with the spreadsheet model of relational composition, the core of it is a particular way of composing a triadic &ldquo;giving&rdquo; relation <math>G \subseteq X \times Y \times Z\!</math> with a dyadic &ldquo;taking&rdquo; relation <math>T \subseteq Y \times Z\!</math> in such a way as to determine a certain dyadic relation <math>(G \circ T) \subseteq X \times Z.\!</math> Table&nbsp;24 schematizes the associated constraints on tuples.
let us equip ourselves with the sorts of graphical and matrical
 
representations that we discovered to provide us with such able
 
assists to the intuition in so many of our previous adventures.
 
</pre>
 
  
==Commentary Note 9.5==
+
<br>
  
<pre>
+
{| align="center" cellpadding="10" cellspacing="0" style="border-left:1px solid black; border-top:1px solid black; border-right:1px solid black; border-bottom:1px solid black; text-align:center; width:60%"
Peirce's comma operation, in its application to an absolute term,
+
|+ style="height:30px" | <math>\text{Table 24.} ~~ \text{Another Brand of Composition}\!</math>
is tantamount to the representation of that term's denotation as
+
|-
an idempotent transformation, which is commonly represented as a
+
| style="border-right:1px solid black; border-bottom:1px solid black; width:25%" | &nbsp;
diagonal matrix.  This is why I call it the "diagonal extension".
+
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>G\!</math>
 +
| <math>X\!</math>
 +
| <math>Y\!</math>
 +
| <math>Z\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>T\!</math>
 +
| &nbsp;
 +
| <math>Y\!</math>
 +
| <math>Z\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>G \circ T</math>
 +
| <math>X\!</math>
 +
| &nbsp;
 +
| <math>Z\!</math>
 +
|}
  
An idempotent element x is given by the abstract condition that xx = x,
+
<br>
but we commonly encounter such elements in more concrete circumstances,
 
acting as operators or transformations on other sets or spaces, and in
 
that action they will often be represented as matrices of coefficients.
 
  
Let's see how all of this looks from the graphical and matrical perspectives.
+
So we see that the notorious teridentity relation, which I have left equivocally denoted by the same symbol as the identity relation <math>\mathit{1},\!</math> is already implicit in Peirce's discussion at this point.
  
Absolute terms:
+
===Commentary Note 10.9===
  
1 = "anybody"  =  B +, C +, D +, E +, I +, J +, O
+
The use of the concepts of identity and teridentity is not to identify a thing-in-itself with itself, much less twice or thrice over &mdash; there is no need and therefore no utility in that. I&nbsp;can imagine Peirce asking, on Kantian principles if not entirely on Kantian premisses, <i>Where is the manifold to be unified?</i> The manifold that demands unification does not reside in the object but in the phenomena, that is, in the appearances that might have been appearances of different objects but that happen to be constrained by these identities to being just so many aspects, facets, parts, roles, or signs of one and the same object.
  
m  =  "man"      =  C +, I +, J +, O
+
For example, notice how the various identity concepts actually functioned in the last example, where they had the opportunity to show their behavior in something like their natural habitat.
  
n  =  "noble"    =  C +, D +, O
+
The use of the teridentity concept in the case of the &ldquo;giver of a horse to a taker of it&rdquo; is to say that the thing appearing with respect to its quality under an absolute term, <i>a&nbsp;horse</i>, the thing appearing with respect to its existence as the correlate of a dyadic relative, <i>a&nbsp;potential possession</i>, and the thing appearing with respect to its synthesis as the correlate of a triadic relative, <i>a&nbsp;gift</i>, are one and the same thing.
  
= "woman"    = B +, D +, E
+
===Commentary Note 10.10===
  
Previously, we represented absolute terms as column vectors.
+
The last of the three examples involving the composition of triadic relatives with dyadic relatives is shown again in Figure&nbsp;25.
The above four terms are given by the columns of this table:
 
  
  | 1 m n w
+
{| align="center" cellpadding="10"
---o---------
+
| [[Image:LOR 1870 Figure 18.jpg]] || (25)
B | 1 0 0 1
+
|}
C | 1 1 1 0
 
D | 1 0 1 1
 
E | 1 0 0 1
 
I | 1 1 0 0
 
J | 1 1 0 0
 
O | 1 1 1 0
 
  
One way to represent sets in the bigraph picture
+
The hypergraph picture of the abstract composition is given in Figure&nbsp;26.
is simply to mark the nodes in some way, like so:
 
  
    B  C  D  E  I  J  O
+
{| align="center" cellpadding="10"
1  +  +  +  +  +  +  +
+
| [[Image:LOR 1870 Figure 26.jpg]] || (26)
 +
|}
  
    B  C  D  E  I  J  O
+
This example illustrates the way that Peirce analyzes the logical conjunction, we might even say the ''parallel conjunction'', of a pair of dyadic relatives in terms of the comma extension and the same style of composition that we saw in the last example, that is, according to a pattern of anaphora that invokes the teridentity relation.
m  o  +  o  o  +  +  +
 
  
    B  C  D  E  I  J  O
+
If we lay out this analysis of conjunction on the spreadsheet model of relational composition, the gist of it is the diagonal extension of a dyadic ''loving'' relation <math>L \subseteq X \times Y\!</math> to the corresponding triadic ''being and loving'' relation <math>L \subseteq X \times X \times Y,\!</math> which is then composed in a specific way with a dyadic ''serving'' relation <math>S \subseteq X \times Y\!</math> so as to determine the dyadic relation <math>L,\!S \subseteq X \times Y.\!</math>  Table&nbsp;27 schematizes the associated constraints on tuples.
n  o  +  +  o  o  o  +
 
  
    B  C  D  E  I  J  O
+
<br>
w  +  o  +  +  o  o  o
 
  
Diagonal extensions of the absolute terms:
+
{| align="center" cellpadding="10" cellspacing="0" style="border-left:1px solid black; border-top:1px solid black; border-right:1px solid black; border-bottom:1px solid black; text-align:center; width:60%"
 +
|+ style="height:30px" | <math>\text{Table 27.} ~~ \text{Conjunction Via Composition}\!</math>
 +
|-
 +
| style="border-right:1px solid black; border-bottom:1px solid black; width:25%" | &nbsp;
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>L,\!</math>
 +
| <math>X\!</math>
 +
| <math>X\!</math>
 +
| <math>Y\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>S\!</math>
 +
| &nbsp;
 +
| <math>X\!</math>
 +
| <math>Y\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>L,\!S</math>
 +
| <math>X\!</math>
 +
| &nbsp;
 +
| <math>Y\!</math>
 +
|}
  
1,  =  "anybody that is ---"  =  B:B +, C:C +, D:D +, E:E +, I:I +, J:J +, O:O
+
<br>
  
m,  = "man that is ---"      = C:C +, I:I +, J:J +, O:O
+
===Commentary Note 10.11===
  
n, =  "noble that is ---"    =  C:C +, D:D +, O:O
+
Let us return to the point where we left off unpacking the contents of CP&nbsp;3.73. Peirce remarks that the comma operator can be iterated at will:
  
w,  = "woman that is ---"    =  B:B +, D:D +, E:E
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>In point of fact, since a comma may be added in this way to any relative term, it may be added to one of these very relatives formed by a comma, and thus by the addition of two commas an absolute term becomes a relative of two correlates.</p>
  
Naturally enough, the diagonal extensions are represented by diagonal matrices:
+
<p>So:</p>
 +
|-
 +
| align="center" | <math>\mathrm{m},\!,\!\mathrm{b},\!\mathrm{r}</math>
 +
|-
 +
|
 +
<p>interpreted like</p>
 +
|-
 +
| align="center" | <math>\mathfrak{g}\mathit{o}\mathrm{h}</math>
 +
|-
 +
|
 +
<p>means a man that is a rich individual and is a black that is that rich individual.</p>
  
!1!| B C D E I J O
+
<p>But this has no other meaning than:</p>
---o---------------
+
|-
B | 1 0 0 0 0 0 0
+
| align="center" | <math>\mathrm{m},\!\mathrm{b},\!\mathrm{r}</math>
C | 0 1 0 0 0 0 0
+
|-
D | 0 0 1 0 0 0 0
+
|
E | 0 0 0 1 0 0 0
+
<p>or a man that is a black that is rich.</p>
I | 0 0 0 0 1 0 0
 
J | 0 0 0 0 0 1 0
 
O | 0 0 0 0 0 0 1
 
  
!m!| B C D E I J O
+
<p>Thus we see that, after one comma is added, the addition of another does not change the meaning at all, so that whatever has one comma after it must be regarded as having an infinite number.</p>
---o---------------
 
B | 0 0 0 0 0 0 0
 
C | 0 1 0 0 0 0 0
 
D | 0 0 0 0 0 0 0
 
E | 0 0 0 0 0 0 0
 
I | 0 0 0 0 1 0 0
 
J | 0 0 0 0 0 1 0
 
O | 0 0 0 0 0 0 1
 
  
!n!| B C D E I J O
+
<p>(Peirce, CP 3.73).</p>
---o---------------
+
|}
B | 0 0 0 0 0 0 0
 
C | 0 1 0 0 0 0 0
 
D | 0 0 1 0 0 0 0
 
E | 0 0 0 0 0 0 0
 
I | 0 0 0 0 0 0 0
 
J | 0 0 0 0 0 0 0
 
O | 0 0 0 0 0 0 1
 
  
!w!| B C D E I J O
+
Again, let us check whether this makes sense on the stage of our small but dramatic model. Let's say that Desdemona and Othello are rich, and, among the persons of the play, only they. With this premiss we obtain a sample of absolute terms that is sufficiently ample to work through our example:
---o---------------
 
  B | 1 0 0 0 0 0 0
 
  C | 0 0 0 0 0 0 0
 
D | 0 0 1 0 0 0 0
 
E | 0 0 0 1 0 0 0
 
I | 0 0 0 0 0 0 0
 
J | 0 0 0 0 0 0 0
 
O | 0 0 0 0 0 0 0
 
  
Cast into the bigraph picture of 2-adic relations,
+
{| align="center" cellspacing="6" width="90%"
the diagonal extension of an absolute term takes on
+
|
a very distinctive sort of "straight-laced" character:
+
<math>\begin{array}{*{15}{c}}
 +
\mathbf{1}
 +
& =      & \mathrm{B}
 +
& +\!\!, & \mathrm{C}
 +
& +\!\!, & \mathrm{D}
 +
& +\!\!, & \mathrm{E}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{b}
 +
& =      & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{m}
 +
& =      & \mathrm{C}
 +
& +\!\!, & \mathrm{I}
 +
& +\!\!, & \mathrm{J}
 +
& +\!\!, & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{r}
 +
& =      & \mathrm{D}
 +
& +\!\!, & \mathrm{O}
 +
\end{array}</math>
 +
|}
  
    B  C  D  E  I  J  O
+
One application of the comma operator yields the following 2-adic relatives:
u  o  o  o  o  o  o  o
 
    |  |  |  |  |  |  |
 
1,  |  |  |  |  |  |  |
 
    |  |  |  |  |  |  |
 
u  o  o  o  o  o  o  o
 
    B  C  D  E  I  J  O
 
  
    B   C   D   E   I   J   O
+
{| align="center" cellspacing="6" width="90%"
u  o  o  o  o  o  o  o
+
|
        |          |  |  |
+
<math>\begin{array}{*{15}{c}}
m,      |          |  |  |
+
\mathbf{1,}
        |          |  |  |
+
& =      & \mathrm{B}\!:\!\mathrm{B}
u  o  o  o  o  o  o  o
+
& +\!\!, & \mathrm{C}\!:\!\mathrm{C}
    B  C  D   E  I  J  O
+
& +\!\!, & \mathrm{D}\!:\!\mathrm{D}
 +
& +\!\!, & \mathrm{E}\!:\!\mathrm{E}
 +
& +\!\!, & \mathrm{I}\!:\!\mathrm{I}
 +
& +\!\!, & \mathrm{J}\!:\!\mathrm{J}
 +
& +\!\!, & \mathrm{O}\!:\!\mathrm{O}
 +
\\[6pt]
 +
\mathrm{b,}
 +
& =      & \mathrm{O}\!:\!\mathrm{O}
 +
\\[6pt]
 +
\mathrm{m,}
 +
& =     & \mathrm{C}\!:\!\mathrm{C}
 +
& +\!\!, & \mathrm{I}\!:\!\mathrm{I}
 +
& +\!\!, & \mathrm{J}\!:\!\mathrm{J}
 +
& +\!\!, & \mathrm{O}\!:\!\mathrm{O}
 +
\\[6pt]
 +
\mathrm{r,}
 +
& =      & \mathrm{D}\!:\!\mathrm{D}
 +
& +\!\!, & \mathrm{O}\!:\!\mathrm{O}
 +
\end{array}</math>
 +
|}
  
    B  C  D  E  I  J  O
+
Another application of the comma operator generates the following 3-adic relatives:
u  o  o  o  o  o  o  o
 
        |  |              |
 
n,      |  |              |
 
        |  |              |
 
u  o  o  o  o  o  o  o
 
    B  C  D  E  I  J  O
 
  
    B   C   D   E   I   J   O
+
{| align="center" cellspacing="6" width="90%"
u  o  o  o  o  o  o  o
+
|
    |      |  |
+
<math>\begin{array}{*{9}{c}}
w,  |      |  |
+
\mathbf{1,\!,}
    |      |  |
+
& =      & \mathrm{B}\!:\!\mathrm{B}\!:\!\mathrm{B}
u  o  o  o  o  o  o  o
+
& +\!\!, & \mathrm{C}\!:\!\mathrm{C}\!:\!\mathrm{C}
    B  C   D  E  I   J   O
+
& +\!\!, & \mathrm{D}\!:\!\mathrm{D}\!:\!\mathrm{D}
</pre>
+
& +\!\!, & \mathrm{E}\!:\!\mathrm{E}\!:\!\mathrm{E}
 +
\\
 +
&        &
 +
& +\!\!, & \mathrm{I}\!:\!\mathrm{I}\!:\!\mathrm{I}
 +
& +\!\!, & \mathrm{J}\!:\!\mathrm{J}\!:\!\mathrm{J}
 +
& +\!\!, & \mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{O}
 +
\\[6pt]
 +
\mathrm{b,\!,}
 +
& =      & \mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{O}
 +
\\[6pt]
 +
\mathrm{m,\!,}
 +
& =      & \mathrm{C}\!:\!\mathrm{C}\!:\!\mathrm{C}
 +
& +\!\!, & \mathrm{I}\!:\!\mathrm{I}\!:\!\mathrm{I}
 +
& +\!\!, & \mathrm{J}\!:\!\mathrm{J}\!:\!\mathrm{J}
 +
& +\!\!, & \mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{O}
 +
\\[6pt]
 +
\mathrm{r,\!,}
 +
& =      & \mathrm{D}\!:\!\mathrm{D}\!:\!\mathrm{D}
 +
& +\!\!, & \mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{O}
 +
\end{array}</math>
 +
|}
  
==Commentary Note 9.6==
+
Assuming the associativity of multiplication among 2-adic relatives, we may compute the product <math>~\mathrm{m},\mathrm{b},\mathrm{r}~</math> by a brute force method as follows:
  
<pre>
+
{| align="center" cellspacing="6" width="90%"
Just to be doggedly persistent about it all, here is what
+
|
ought to be a sufficient sample of products involving the
+
<math>\begin{array}{lll}
multiplication of a comma relative onto an absolute term,
+
\mathrm{m},\mathrm{b},\mathrm{r}
presented in both graphical and matrical representations.
+
& = &
 +
(\mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O})(\mathrm{O}\!:\!\mathrm{O})(\mathrm{D} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O})(\mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{O}
 +
\end{array}</math>
 +
|}
  
Example 1. Anything That Is Anything
+
This says that a man that is black that is rich is Othello, which is true on the premisses of our present universe of discourse.
  
1,= 1
+
Following the standard associative combinations of <math>\mathfrak{g}\mathit{o}\mathrm{h},</math> the product <math>~\mathrm{m},\!,\mathrm{b},\mathrm{r}~</math> is multiplied out along the following lines, where the trinomials of the form <math>\mathrm{(X\!:\!Y\!:\!Z)(Y\!:\!Z)(Z)}\!</math> are the only ones that produce a non-null result, namely, <math>\mathrm{(X\!:\!Y\!:\!Z)(Y\!:\!Z)(Z) = X}.\!</math>
  
"anything that is anything" = "anything"
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
\mathrm{m},\!,\mathrm{b},\mathrm{r}
 +
& = &
 +
(\mathrm{C}\!:\!\mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{O})(\mathrm{O}\!:\!\mathrm{O})(\mathrm{D} ~+\!\!,~ \mathrm{O})
 +
\\[6pt]
 +
& = &
 +
(\mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{O})(\mathrm{O}\!:\!\mathrm{O})(\mathrm{O})
 +
\\[6pt]
 +
& = &
 +
\mathrm{O}
 +
\end{array}</math>
 +
|}
  
B  C  D  E  I  J  O
+
So we have that <math>\mathrm{m},\!,\mathrm{b},\mathrm{r} ~=~ \mathrm{m},\mathrm{b},\mathrm{r}.</math>
+  +  +  +  +  +  +  1
 
|  |  |  |  |  |  |
 
|  |  |  |  |  |  |  1,
 
|  |  |  |  |  |  |
 
o  o  o  o  o  o  o  =
 
  
+  +  +  +  +  +  +  1
+
In closing, observe that the teridentity relation has turned up again in this context, as the second comma-ing of the universal term itself:
B  C  D  E  I  J  O
 
  
| 1 0 0 0 0 0 0 | | 1 |    | 1 |
+
{| align="center" cellspacing="6" width="90%"
| 0 1 0 0 0 0 0 | | 1 |    | 1 |
+
|
| 0 0 1 0 0 0 0 | | 1 |    | 1 |
+
<math>\begin{array}{l}
| 0 0 0 1 0 0 0 | | 1 = | 1 |
+
\mathbf{1},\!, ~=~
| 0 0 0 0 1 0 0 | | 1 |    | 1 |
+
\mathrm{B}\!:\!\mathrm{B}\!:\!\mathrm{B} ~+\!\!,~ \mathrm{C}\!:\!\mathrm{C}\!:\!\mathrm{C} ~+\!\!,~ \mathrm{D}\!:\!\mathrm{D}\!:\!\mathrm{D} ~+\!\!,~ \mathrm{E}\!:\!\mathrm{E}\!:\!\mathrm{E} ~+\!\!,~ \mathrm{I}\!:\!\mathrm{I}\!:\!\mathrm{I} ~+\!\!,~ \mathrm{J}\!:\!\mathrm{J}\!:\!\mathrm{J} ~+\!\!,~ \mathrm{O}\!:\!\mathrm{O}\!:\!\mathrm{O}
| 0 0 0 0 0 1 0 | | 1 |    | 1 |
+
\end{array}</math>
| 0 0 0 0 0 0 1 | | 1 |    | 1 |
+
|}
  
Example 2. Anything That Is Man
+
===Commentary Note 10.12===
  
1,m  =  m
+
Potential ambiguities in Peirce's two versions of the &ldquo;rich black man&rdquo; example can be resolved by providing them with explicit graphical markups, as shown in Figures&nbsp;28&nbsp;and&nbsp;29.
  
"anything that is man" = "man"
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 28.jpg]] || (28)
 +
|-
 +
| [[Image:LOR 1870 Figure 29.jpg]] || (29)
 +
|}
  
B  C  D  E  I  J  O
+
On the other hand, as the forms of relational composition become more complex, the corresponding algebraic products of elementary relatives, for example, <math>\mathrm{(x\!:\!y\!:\!z)(y\!:\!z)(z)},\!</math> will not always determine unique results without the addition of more information about the intended linking of terms.
o  +  o  o  +  +  +  m
 
|  |  |  |  |  |  |
 
|  |  |  |  |  |  |  1,
 
|  |  |  |  |  |  |
 
o  o  o  o  o  o  o  =
 
  
o  +  o  o  +  +  +  m
+
==Selection 11==
B  C  D  E  I  J  O
 
  
| 1 0 0 0 0 0 0 | | 0 |    | 0 |
+
===The Signs for Multiplication (concl.)===
| 0 1 0 0 0 0 0 | | 1 |    | 1 |
 
| 0 0 1 0 0 0 0 | | 0 |    | 0 |
 
| 0 0 0 1 0 0 0 | | 0 |  = | 0 |
 
| 0 0 0 0 1 0 0 | | 1 |    | 1 |
 
| 0 0 0 0 0 1 0 | | 1 |    | 1 |
 
| 0 0 0 0 0 0 1 | | 1 |    | 1 |
 
  
Example 3Man That Is Anything
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>The conception of multiplication we have adopted is that of the application of one relation to anotherSo, a quaternion being the relation of one vector to another, the multiplication of quaternions is the application of one such relation to a second.</p>
  
m,1  =  m
+
<p>Even ordinary numerical multiplication involves the same idea, for <math>~2 \times 3~</math> is a pair of triplets, and <math>~3 \times 2~</math> is a triplet of pairs, where "triplet of" and "pair of" are evidently relatives.</p>
  
"man that is anything"  = "man"
+
<p>If we have an equation of the form:</p>
 +
|-
 +
| align="center" | <math>xy ~=~ z</math>
 +
|-
 +
|
 +
<p>and there are just as many <math>x\!</math>'s per <math>y\!</math> as there are, ''per'' things, things of the universe, then we have also the arithmetical equation:</p>
 +
|-
 +
| align="center" | <math>[x][y] ~=~ [z].</math>
 +
|-
 +
|
 +
<p>For instance, if our universe is perfect men, and there are as many teeth to a Frenchman (perfect understood) as there are to any one of the universe, then:</p>
 +
|-
 +
| align="center" | <math>[\mathit{t}][\mathrm{f}] ~=~ [\mathit{t}\mathrm{f}]</math>
 +
|-
 +
|
 +
<p>holds arithmetically.</p>
  
B  C  D  E  I  J  O
+
<p>So if men are just as apt to be black as things in general:</p>
+  +  +  +  +  +  +  1
+
|-
    |          |  |  |
+
| align="center" | <math>[\mathrm{m,}][\mathrm{b}] ~=~ [\mathrm{m,}\mathrm{b}]</math>
    |           |   |  |  m,
+
|-
    |           |  |  |
+
|
o  o  o  o  o  o  o  =
+
<p>where the difference between <math>[\mathrm{m}]\!</math> and <math>[\mathrm{m,}]\!</math> must not be overlooked.</p>
  
o  +  o  o  +  +  + m
+
<p>It is to be observed that:</p>
B  C  D  E  I   J  O
+
|-
 +
| align="center" | <math>[\mathit{1}] ~=~ \mathfrak{1}.</math>
 +
|-
 +
|
 +
<p>Boole was the first to show this connection between logic and probabilities.  He was restricted, however, to absolute terms. I do not remember having seen any extension of probability to relatives, except the ordinary theory of ''expectation''.</p>
  
| 0 0 0 0 0 0 0 | | 1 |    | 0 |
+
<p>Our logical multiplication, then, satisfies the essential conditions of multiplication, has a unity, has a conception similar to that of admitted multiplications, and contains numerical multiplication as a case under it.</p>
| 0 1 0 0 0 0 0 | | 1 |    | 1 |
 
| 0 0 0 0 0 0 0 | | 1 |    | 0 |
 
| 0 0 0 0 0 0 0 | | 1 |  =  | 0 |
 
| 0 0 0 0 1 0 0 | | 1 |    | 1 |
 
| 0 0 0 0 0 1 0 | | 1 |    | 1 |
 
| 0 0 0 0 0 0 1 | | 1 |    | 1 |
 
  
Example 4. Man That Is Noble
+
<p>(Peirce, CP 3.76).</p>
 +
|}
  
m,n  = "man that is noble"
+
===Commentary Note 11.1===
  
B  C  D  E  I   J  O
+
We have reached a suitable place to pause in our reading of Peirce's text &mdash; actually, it's more like a place to run as fast as we can along a parallel track &mdash; where I can pay off a few of the expository IOUs I've been using to pave the way to this point.
o  +  +  o  o  o  +  n
 
    |          |  |  |
 
    |          |  |  |  m,
 
    |          |  |  |
 
o  o  o  o  o  o  o  =
 
  
o  +  o  o  o  o  + m,n
+
The more pressing debts that come to mind are concerned with the matter of Peirce's &ldquo;number of&rdquo; function that maps a term <math>t\!</math> into a number <math>[t],\!</math> and with my justification for calling a certain style of illustration the ''hypergraph picture'' of relational composition. As it happens, there is a thematic relation between these topics, and so I can make my way forward by addressing them together.
B  C  D  E  I   J  O
 
  
| 0 0 0 0 0 0 0 | | 0 |    | 0 |
+
At this point we have two good pictures of how to compute the relational compositions of arbitrary dyadic relations, namely, the bigraph representation and the matrix representation, each of which has its differential advantages in different types of situations.
| 0 1 0 0 0 0 0 | | 1 |    | 1 |
 
| 0 0 0 0 0 0 0 | | 1 |    | 0 |
 
| 0 0 0 0 0 0 0 | | 0 |  =  | 0 |
 
| 0 0 0 0 1 0 0 | | 0 |    | 0 |
 
| 0 0 0 0 0 1 0 | | 0 |    | 0 |
 
| 0 0 0 0 0 0 1 | | 1 |    | 1 |
 
  
Example 5Noble That Is Man
+
But we do not have a comparable picture of how to compute the richer variety of relational compositions that involve triadic or any higher adicity relationsAs a matter of fact, we run into a non-trivial classification problem simply to enumerate the different types of compositions that arise in these cases.
  
n,m  =  "noble that is man"
+
Therefore, let us inaugurate a systematic study of relational composition, general enough to articulate the &ldquo;generative potency&rdquo; of Peirce's 1870 Logic of Relatives.
  
B  C  D  E  I  J  O
+
===Commentary Note 11.2===
o  +  o  o  +  +  +  m
 
    |  |              |
 
    |  |              |  n,
 
    |  |              |
 
o  o  o  o  o  o  o  =
 
  
o  +  o  o  o  o  +  n,m
+
Let's bring together the various things that Peirce has said about the &ldquo;number of function&rdquo; up to this point in the paper.
B  C  D  E  I  J  O
 
  
| 0 0 0 0 0 0 0 | | 0 |    | 0 |
+
====NOF 1====
| 0 1 0 0 0 0 0 | | 1 |    | 1 |
+
 
| 0 0 1 0 0 0 0 | | 0 |    | 0 |
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
| 0 0 0 0 0 0 0 | | 0 |  = | 0 |
+
|
| 0 0 0 0 0 0 0 | | 1 |    | 0 |
+
<p>I propose to assign to all logical terms, numbers;  to an absolute term, the number of individuals it denotes;  to a relative term, the average number of things so related to one individual.  Thus in a universe of perfect men (''men''), the number of &ldquo;tooth of&rdquo; would be 32.  The number of a relative with two correlates would be the average number of things so related to a pair of individuals;  and so on for relatives of higher numbers of correlates.  I propose to denote the number of a logical term by enclosing the term in square brackets, thus <math>[t].\!</math></p>
| 0 0 0 0 0 0 0 | | 1 |    | 0 |
 
| 0 0 0 0 0 0 1 | | 1 |    | 1 |
 
</pre>
 
  
==Commentary Note 9.7==
+
<p>(Peirce, CP 3.65).</p>
 +
|}
  
<pre>
+
====NOF 2====
From this point forward we may think of idempotents, selectives,
 
and zero-one diagonal matrices as being roughly equivalent notions.
 
The only reason that I say "roughly" is that we are comparing ideas
 
at different levels of abstraction when we propose these connections.
 
  
We have covered the way that Peirce uses his invention of the
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
comma modifier to assimilate boolean multiplication, logical
+
|
conjunction, or what we may think of as "serial selection"
+
<p>But not only do the significations of <math>~=~</math> and <math>~<~</math> here adopted fulfill all absolute requirements, but they have the supererogatory virtue of being very nearly the same as the common significations.  Equality is, in fact, nothing but the identity of two numbers;  numbers that are equal are those which are predicable of the same collections, just as terms that are identical are those which are predicable of the same classes.  So, to write <math>~5 < 7~</math> is to say that <math>~5~</math> is part of <math>~7~</math>, just as to write <math>~\mathrm{f} < \mathrm{m}~</math> is to say that Frenchmen are part of men.  Indeed, if <math>~\mathrm{f} < \mathrm{m}~</math>, then the number of Frenchmen is less than the number of men, and if <math>~\mathrm{v} = \mathrm{p}~</math>, then the number of Vice-Presidents is equal to the number of Presidents of the Senate;  so that the numbers may always be substituted for the terms themselves, in case no signs of operation occur in the equations or inequalities.</p>
under his more general account of relative multiplication.
 
  
But the comma functor has its application to relative terms
+
<p>(Peirce, CP 3.66).</p>
of any arity, not just the zeroth arity of absolute terms,
+
|}
and so there will be a lot more to explore on this point.
 
But now I must return to the anchorage of Peirce's text,
 
and hopefully get a chance to revisit this topic later.
 
</pre>
 
  
==Selection 10==
+
====NOF 3====
  
<pre>
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
| The Signs for Multiplication (cont.)
 
 
|
 
|
| The sum 'x' + 'x' generally denotes no logical term.
+
<p>It is plain that both the regular non-invertible addition and the invertible addition satisfy the absolute conditions.  But the notation has other recommendations.  The conception of ''taking together'' involved in these processes is strongly analogous to that of summation, the sum of 2 and 5, for example, being the number of a collection which consists of a collection of two and a collection of five.  Any logical equation or inequality in which no operation but addition is involved may be converted into a numerical equation or inequality by substituting the numbers of the several terms for the terms themselves &mdash; provided all the terms summed are mutually exclusive.</p>
| But 'x',_oo + 'x',_oo may be considered as denoting
+
 
| some two 'x's.
+
<p>Addition being taken in this sense, ''nothing'' is to be denoted by ''zero'', for then</p>
 +
|-
 +
| align="center" | <math>x ~+\!\!,~ 0 ~=~ x</math>
 +
|-
 
|
 
|
| It is natural to write:
+
<p>whatever is denoted by <math>~x~</math>;  and this is the definition of ''zero''.  This interpretation is given by Boole, and is very neat, on account of the resemblance between the ordinary conception of ''zero'' and that of nothing, and because we shall thus have</p>
 +
|-
 +
| align="center" | <math>[0] ~=~ 0.</math>
 +
|-
 
|
 
|
| 'x' + 'x'  = !2!.'x'
+
<p>(Peirce, CP 3.67).</p>
 +
|}
 +
 
 +
====NOF 4====
 +
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| and
+
<p>The conception of multiplication we have adopted is that of the application of one relation to another.  &hellip;</p>
 +
 
 +
<p>Even ordinary numerical multiplication involves the same idea, for <math>~2 \times 3~</math> is a pair of triplets, and <math>~3 \times 2~</math> is a triplet of pairs, where &ldquo;triplet of&rdquo; and &ldquo;pair of&rdquo; are evidently relatives.</p>
 +
 
 +
<p>If we have an equation of the form:</p>
 +
|-
 +
| align="center" | <math>xy ~=~ z</math>
 +
|-
 
|
 
|
| 'x',_oo + 'x',_oo  = !2!.'x',_oo
+
<p>and there are just as many <math>x\!</math>'s per <math>y\!</math> as there are, ''per'' things, things of the universe, then we have also the arithmetical equation:</p>
 +
|-
 +
| align="center" | <math>[x][y] ~=~ [z].</math>
 +
|-
 
|
 
|
| where the dot shows that this multiplication is invertible.
+
<p>For instance, if our universe is perfect men, and there are as many teeth to a Frenchman (perfect understood) as there are to any one of the universe, then:</p>
 +
|-
 +
| align="center" | <math>[\mathit{t}][\mathrm{f}] ~=~ [\mathit{t}\mathrm{f}]</math>
 +
|-
 
|
 
|
| We may also use the antique figures so that:
+
<p>holds arithmetically.</p>
 +
 
 +
<p>So if men are just as apt to be black as things in general:</p>
 +
|-
 +
| align="center" | <math>[\mathrm{m,}][\mathrm{b}] ~=~ [\mathrm{m,}\mathrm{b}]</math>
 +
|-
 
|
 
|
| !2!.'x',_oo  = `2`'x'
+
<p>where the difference between <math>[\mathrm{m}]\!</math> and <math>[\mathrm{m,}]\!</math> must not be overlooked.</p>
 +
 
 +
<p>It is to be observed that:</p>
 +
|-
 +
| align="center" | <math>[\mathit{1}] ~=~ \mathfrak{1}.</math>
 +
|-
 
|
 
|
| just as
+
<p>Boole was the first to show this connection between logic and probabilities. He was restricted, however, to absolute terms. I do not remember having seen any extension of probability to relatives, except the ordinary theory of ''expectation''.</p>
|
+
 
| !1!_oo = `1`.
+
<p>Our logical multiplication, then, satisfies the essential conditions of multiplication, has a unity, has a conception similar to that of admitted multiplications, and contains numerical multiplication as a case under it.</p>
|
+
 
| Then `2` alone will denote some two things.
+
<p>(Peirce, CP 3.76).</p>
|
+
|}
| But this multiplication is not in general commutative,
+
 
| and only becomes so when it affects a relative which
+
===Commentary Note 11.3===
| imparts a relation such that a thing only bears it
+
 
| to 'one' thing, and one thing 'alone' bears it to
+
Before I can discuss Peirce's &ldquo;number of&rdquo; function in greater detail I will need to deal with an expositional difficulty that I have been very carefully dancing around all this time, but one that will no longer abide its assigned place under the rug.
| a thing.
+
 
|
+
Functions have long been understood, from well before Peirce's time to ours, as special cases of dyadic relations, so the &ldquo;number of&rdquo; function itself is already to be numbered among the types of dyadic relatives that we've been explicitly mentioning and implicitly using all this time.  But Peirce's way of talking about a dyadic relative term is to list the &ldquo;relate&rdquo; first and the &ldquo;correlate&rdquo; second, a convention that goes over into functional terms as making the functional value first and the functional argument second, whereas almost anyone brought up in our present time frame has difficulty thinking of a function any other way than as a set of ordered pairs where the order in each pair lists the functional argument first and the functional value second.
| For instance, the lovers of two women are not
 
| the same as two lovers of women, that is:
 
|
 
| 'l'`2`.w
 
|
 
| and
 
|
 
| `2`.'l'w
 
|
 
| are unequal;
 
|
 
| but the husbands of two women are the
 
| same as two husbands of women, that is:
 
|
 
| 'h'`2`.w  =  `2`.'h'w
 
|
 
| and in general:
 
|
 
| 'x',`2`.'y'  = `2`.'x','y'.
 
|
 
| C.S. Peirce, CP 3.75
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
  
 +
All of these syntactic wrinkles can be ironed out in a very smooth way, given a sufficiently general context of flexible enough interpretive conventions, but not without introducing an order of anachronism into Peirce's presentation that I am presently trying to avoid as much as possible.  Thus, I will need to experiment with various styles of compromise formation.
  
 +
The interpretation of Peirce's 1870 &ldquo;Logic of Relatives&rdquo; can be facilitated by introducing a few items of background material on relations in general, as regarded from a combinatorial point of view.
  
LOR.  Commentary Note 10.1
+
===Commentary Note 11.4===
  
 +
The task before us is to clarify the relationships among relative terms, relations, and the special cases of relations that are given by equivalence relations, functions, and so on.
  
 +
The first obstacle to get past is the order convention that Peirce's orientation to relative terms causes him to use for functions.  To focus on a concrete example of immediate use in this discussion, let's take the &ldquo;number of&rdquo; function that Peirce denotes by means of square brackets and re-formulate it as a dyadic relative term <math>v\!</math> as follows:
  
What Peirce is attempting to do in CP 3.75 is absolutely amazing,
+
{| align="center" cellspacing="6" width="90%"
and I personally did not see anything on par with it again until
+
| <math>v(t) ~:=~ [t] ~=~ \text{the number of the term}~ t.\!</math>
I began to study the application of mathematical category theory
+
|}
to computation and logic, back in the mid 1980's.  To completely
 
evaluate the success of this attempt, we would have to return to
 
Peirce's earlier paper "Upon the Logic of Mathematics" (1867) to
 
pick up some of the ideas about arithmetic that he set out there.
 
  
Another branch of the investigation would require that we examine
+
To set the dyadic relative term <math>v\!</math> within a suitable context of interpretation, let us suppose that <math>v\!</math> corresponds to a relation <math>V \subseteq \mathbb{R} \times S,\!</math> where <math>\mathbb{R}\!</math> is the set of real numbers and <math>S\!</math> is a suitable syntactic domain, here described as a set of ''terms''.  The dyadic relation <math>V\!</math> is at first sight a function from <math>S\!</math> to <math>\mathbb{R}.\!</math>  There is, however, a very great likelihood that we cannot always assign numbers to every term in whatever syntactic domain <math>S\!</math> we happen to choose, so we may eventually be forced to treat the dyadic relation <math>V\!</math> as a partial function from <math>S\!</math> to <math>\mathbb{R}.\!</math>  All things considered, then, let me try out the following impedimentaria of strategies and compromises.
more careully the entire syntactic mechanics of "subjacent signs"
 
that Peirce uses to establish linkages among relational domains.
 
It is important to note that these types of indices constitute
 
a diacritical, interpretive, syntactic category under which
 
Peirce also places the comma functor.
 
  
The way that I would currently approach both of these branches
+
First, I adapt the functional arrow notation so that it allows us to detach the functional orientation from the order in which the names of domains are written on the page.  Second, I change the notation for ''partial functions'', or ''pre-functions'', to one that is less likely to be confounded. This gives the scheme:
of the investigation would be to open up a wider context for
 
the study of relational compositions, attempting to get at
 
the essence of what is going on we when relate relations,
 
possibly complex, to other relations, possibly simple.
 
  
But that will take another cup of java ('c'j) ---
+
{| align="center" cellspacing="6" width="90%"
or maybe two, `2`'c'j = (!2!.'c',_oo)j ...
+
| <math>q : X \to Y\!</math> means that <math>q\!</math> is functional at <math>X.\!</math>
 +
|-
 +
| <math>q : X \leftarrow Y\!</math> means that <math>q\!</math> is functional at <math>Y.\!</math>
 +
|-
 +
| <math>q : X \rightharpoonup Y\!</math> means that <math>q\!</math> is pre-functional at <math>X.\!</math>
 +
|-
 +
| <math>q : X \leftharpoonup Y\!</math> means that <math>q\!</math> is pre-functional at <math>Y.\!</math>
 +
|}
  
 +
Until it becomes necessary to stipulate otherwise, let us assume that <math>v\!</math> is a function in <math>\mathbb{R}\!</math> of <math>S,\!</math> written <math>v : \mathbb{R} \leftarrow S,\!</math> amounting to the functional alias of the dyadic relation <math>V \subseteq \mathbb{R} \times S\!</math> and associated with the dyadic relative term <math>v\!</math> whose relate lies in the set <math>\mathbb{R}\!</math> of real numbers and whose correlate lies in the set <math>S\!</math> of syntactic terms.
  
 +
'''Note.'''  See the article [[Relation Theory]] for the definitions of ''functions'' and ''pre-functions'' used in this section.
  
LOR.  Commentary Note 10.2
+
===Commentary Note 11.5===
  
 +
The right form of diagram can be a great aid in rendering complex matters comprehensible, so let's extract the overly compressed bits of the &ldquo;[[Relation Theory]]&rdquo; article that we need to illuminate Peirce's 1870 &ldquo;Logic Of Relatives&rdquo; and draw what icons we can within the current frame.
  
 +
For the immediate present, we may start with dyadic relations and describe the customary species of relations and functions in terms of their local and numerical incidence properties.
  
To say that a relative term "imparts a relation"
+
Let <math>P \subseteq X \times Y\!</math> be an arbitrary dyadic relation.  The following properties of <math>P\!</math> can be defined:
is to say that it conveys information about the
 
space of tuples in a cartesian product, that is,
 
it determines a particular subset of that space.
 
  
When we study the combinations of relative terms, from the most
+
{| align="center" cellspacing="6" width="90%"
elementary forms of composition to the most complex patterns of
+
|
correlation, we are considering the ways that these constraints,
+
<math>\begin{array}{lll}
determinations, and informations, as imparted by relative terms,
+
P ~\text{is total at}~ X
can be compounded in the formation of syntax.
+
& \iff &
 +
P ~\text{is}~ (\ge 1)\text{-regular}~ \text{at}~ X.
 +
\\[6pt]
 +
P ~\text{is total at}~ Y
 +
& \iff &
 +
P ~\text{is}~ (\ge 1)\text{-regular}~ \text{at}~ Y.
 +
\\[6pt]
 +
P ~\text{is tubular at}~ X
 +
& \iff &
 +
P ~\text{is}~ (\le 1)\text{-regular}~ \text{at}~ X.
 +
\\[6pt]
 +
P ~\text{is tubular at}~ Y
 +
& \iff &
 +
P ~\text{is}~ (\le 1)\text{-regular}~ \text{at}~ Y.
 +
\end{array}</math>
 +
|}
  
Let us go back and look more carefully at just how it happens that
+
If <math>P \subseteq X \times Y\!</math> is tubular at <math>X,\!</math> then <math>P\!</math> is known as a ''partial function'' or a ''pre-function'' from <math>X\!</math> to <math>Y,\!</math> frequently signalized by renaming <math>P\!</math> with an alternate lower case name, say <math>{}^{\backprime\backprime} p {}^{\prime\prime},~\!</math> and writing <math>p : X \rightharpoonup Y.\!</math>
Peirce's jacent terms and subjacent indices manage to impart their
 
respective measures of information about relations.
 
  
I will begin with the two examples illustrated in Figures 1 and 2,
+
Just by way of formalizing the definition:
where I have drawn in the corresponding lines of identity between
 
the subjacent marks of reference #, $, %.
 
  
o-------------------------------------------------o
+
{| align="center" cellspacing="6" width="90%"
|                                                |
+
|
|                                                |
+
<math>\begin{array}{lll}
|        'l'__#      #'s'__$  $w                |
+
P ~\text{is a pre-function}~ P : X \rightharpoonup Y
|            o      o    o  o                |
+
& \iff &
|              \     /      \ /                  |
+
P ~\text{is tubular at}~ X.
|              \   /        o                  |
+
\\[6pt]
|                \ /          $                  |
+
P ~\text{is a pre-function}~ P : X \leftharpoonup Y
|                o                              |
+
& \iff &
|                #                              |
+
P ~\text{is tubular at}~ Y.
|                                                |
+
\end{array}\!</math>
|                                                 |
+
|}
o-------------------------------------------------o
 
Figure 1.  Lover of a Servant of a Woman
 
  
o-------------------------------------------------o
+
To illustrate these properties, let us fashion a generic enough example of a dyadic relation, <math>E \subseteq X \times Y,~\!</math> where <math>X = Y = \{ 0, 1, \ldots, 8, 9 \},\!</math> and where the bigraph picture of <math>E\!</math> looks like this:
|                                                |
 
|                                                |
 
|        `g`__#__$    #'l'__%  %w  $h          |
 
|            o  o    o    o  o    o            |
 
|              \ \ /       \ /    /            |
 
|              \ \/        o    /              |
 
|                \ /\         %  /               |
 
|                o  ------o------                |
 
|                #        $                      |
 
|                                                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 2.  Giver of a Horse to a Lover of a Woman
 
  
One way to approach the problem of "information fusion"
+
{| align="center" cellpadding="10"
in Peirce's syntax is to soften the distinction between
+
| [[Image:LOR 1870 Figure 30.jpg]] || (30)
jacent terms and subjacent signs, and to treat the types
+
|}
of constraints that they separately signify more on a par
 
with each other.
 
  
To that purpose, I will set forth a way of thinking about
+
If we scan along the <math>X\!</math> dimension from <math>0\!</math> to <math>9\!</math> we see that the incidence degrees of the <math>X\!</math> nodes with the <math>Y\!</math> domain are <math>0, 1, 2, 3, 1, 1, 1, 2, 0, 0,\!</math> in that order.
relational composition that emphasizes the set-theoretic
 
constraints involved in the construction of a composite.
 
  
For example, suppose that we are given the relations L c X x Y, M c Y x Z.
+
If we scan along the <math>Y\!</math> dimension from <math>0\!</math> to <math>9\!</math> we see that the incidence degrees of the <math>Y\!</math> nodes with the <math>X\!</math> domain are <math>0, 0, 3, 2, 1, 1, 2, 1, 1, 0,\!</math> in that order.
Table 3 and Figure 4 present a couple of ways of picturing the constraints
 
that are involved in constructing the relational composition L o M c X x Z.
 
  
Table 3.  Relational Composition
+
Thus, <math>E\!</math> is not total at either <math>X\!</math> or <math>Y,\!</math> since there are nodes in both <math>X\!</math> and <math>Y\!</math> having incidence degrees less than <math>1.\!</math>
o---------o---------o---------o---------o
 
|        #  !1!   |  !1!   |  !1!   |
 
o=========o=========o=========o=========o
 
|    L    #    X    |    Y    |        |
 
o---------o---------o---------o---------o
 
|    M    #        |    Y    |    Z    |
 
o---------o---------o---------o---------o
 
|  L o M  #    X    |        |    Z    |
 
o---------o---------o---------o---------o
 
  
The way to read Table 3 is to imagine that you are
+
Also, <math>E\!</math> is not tubular at either <math>X\!</math> or <math>Y,\!</math> since there are nodes in both <math>X\!</math> and <math>Y\!</math> having incidence degrees greater than <math>1.\!</math>
playing a game that involves placing tokens on the
 
squares of a board that is marked in just this way.
 
The rules are that you have to place a single token
 
on each marked square in the middle of the board in
 
such a way that all of the indicated constraints are
 
satisfied.  That is to say, you have to place a token
 
whose denomination is a value in the set X on each of
 
the squares marked "X", and similarly for the squares
 
marked "Y" and "Z", meanwhile leaving all of the blank
 
squares empty.  Furthermore, the tokens placed in each
 
row and column have to obey the relational constraints
 
that are indicated at the heads of the corresponding
 
row and column.  Thus, the two tokens from X have to
 
denominate the very same value from X, and likewise
 
for Y and Z, while the pairs of tokens on the rows
 
marked "L" and "M" are required to denote elements
 
that are in the relations L and M, respectively.
 
The upshot is that when just this much is done,
 
that is, when the L, M, and !1! relations are
 
satisfied, then the row marked "L o M" will
 
automatically bear the tokens of a pair of
 
elements in the composite relation L o M.
 
  
o-------------------------------------------------o
+
Clearly, then, the relation <math>E\!</math> cannot qualify as a pre-function, much less as a function on either of its relational domains.
|                                                |
 
|                L    L o M    M                |
 
|                @      @      @                |
 
|              / \    / \    / \              |
 
|              o  o  o  o  o  o              |
 
|              X  Y  X  Z  Y  Z              |
 
|              o  o  o  o  o  o              |
 
|              \  \ /    \ /  /              |
 
|                \  /      \  /                |
 
|                \ / \__ __/ \ /                 |
 
|                  @    @    @                  |
 
|                !1!  !1!  !1!                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 4. Relational Composition
 
  
Figure 4 merely shows a different way of viewing the same situation.
+
===Commentary Note 11.6===
  
 +
Let's continue working our way through the above definitions, constructing appropriate examples as we go.
  
 +
<math>E_1\!</math> exemplifies the quality of ''totality at <math>X.\!</math>''
  
LOR. Commentary Note 10.3
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 31.jpg]] || (31)
 +
|}
  
 +
<math>E_2\!</math> exemplifies the quality of ''totality at <math>Y.\!</math>''
  
 +
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 32.jpg]] || (32)
 +
|}
  
I will devote some time to drawing out the relationships
+
<math>E_3\!</math> exemplifies the quality of ''tubularity at <math>X.\!</math>''
that exist among the different pictures of relations and
 
relative terms that were shown above, or as redrawn here:
 
  
o-------------------------------------------------o
+
{| align="center" cellpadding="10"
|                                                |
+
| [[Image:LOR 1870 Figure 33.jpg]] || (33)
|                                                 |
+
|}
|        'l'__$      $'s'__%  %w                |
 
|            o      o    o  o                |
 
|              \    /      \ /                  |
 
|              \  /        o                  |
 
|                \ /          %                  |
 
|                o                              |
 
|                $                              |
 
|                                                 |
 
|                                                 |
 
o-------------------------------------------------o
 
Figure 1.  Lover of a Servant of a Woman
 
  
o-------------------------------------------------o
+
<math>E_4\!</math> exemplifies the quality of ''tubularity at <math>Y.\!</math>''
|                                                |
 
|                                                |
 
|        `g`__$__%    $'l'__*  *w  %h          |
 
|            o  o    o    o  o    o            |
 
|              \ /       \ /    /            |
 
|              \  \/        o    /              |
 
|                \ /\        *  /              |
 
|                o  ------o------                |
 
|                $        %                      |
 
|                                                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 2.  Giver of a Horse to a Lover of a Woman
 
  
Table 3.  Relational Composition
+
{| align="center" cellpadding="10"
o---------o---------o---------o---------o
+
| [[Image:LOR 1870 Figure 34.jpg]] || (34)
|         #  !1!  |  !1!  |  !1!  |
+
|}
o=========o=========o=========o=========o
 
|   L    #    X    |    Y    |         |
 
o---------o---------o---------o---------o
 
|   S    #        |    Y    |    Z    |
 
o---------o---------o---------o---------o
 
|  L o S  #    X    |        |    Z    |
 
o---------o---------o---------o---------o
 
  
o-------------------------------------------------o
+
So <math>E_3\!</math> is a pre-function <math>e_3 : X \rightharpoonup Y,\!</math> and <math>E_4\!</math> is a pre-function <math>e_4 : X \leftharpoonup Y.\!</math>
|                                                |
 
|                L    L o S    S                |
 
|                @      @      @                |
 
|              / \     / \    / \               |
 
|              o  o  o  o  o  o              |
 
|              X  Y  X  Z  Y   Z              |
 
|              o  o  o  o  o  o              |
 
|              \  \ /     \ /   /              |
 
|                \   /      \   /               |
 
|                \ / \__ __/ \ /                |
 
|                  @    @    @                  |
 
|                !1!  !1!  !1!                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 4.  Relational Composition
 
  
Figures 1 and 2 exhibit examples of relative multiplication
+
===Commentary Note 11.7===
in one of Peirce's styles of syntax, to which I subtended
 
lines of identity to mark the anaphora of the correlates.
 
These pictures are adapted to showing the anatomy of the
 
relative terms, while the forms of analysis illustrated
 
in Table 3 and Figure 4 are designed to highlight the
 
structures of the objective relations themselves.
 
  
There are many ways that Peirce might have gotten from his 1870 Notation
+
We come now to the very special cases of dyadic relations that are known as ''functions''.  It will serve a dual purpose on behalf of the present exposition if we take the class of functions as a source of object examples to clarify the more abstruse concepts in the [[Relation Theory]] material.
for the Logic of Relatives to his more evolved systems of Logical Graphs.
 
For my part, I find it interesting to speculate on how the metamorphosis
 
might have been accomplished by way of transformations that act on these
 
nascent forms of syntax and that take place not too far from the pale of
 
its means, that is, as nearly as possible according to the rules and the
 
permissions of the initial system itself.
 
  
In Existential Graphs, a relation is represented by a node
+
To begin, let's recall the definition of a ''local flag'':
whose degree is the adicity of that relation, and which is
 
adjacent via lines of identity to the nodes that represent
 
its correlative relations, including as a special case any
 
of its terminal individual arguments.
 
  
In the 1870 Logic of Relatives, implicit lines of identity are invoked by
+
{| align="center" cellspacing="6" width="90%"
the subjacent numbers and marks of reference only when a correlate of some
+
| <math>L_{x \,\text{at}\, j} = \{ (x_1, \ldots, x_j, \ldots, x_k) \in L : x_j = x \}.\!</math>
relation is the relate of some relation.  Thus, the principal relate, which
+
|}
is not a correlate of any explicit relation, is not singled out in this way.
 
  
Remarkably enough, the comma modifier itself provides us with a mechanism
+
In the case of a dyadic relation <math>L \subseteq X_1 \times X_2 = X \times Y,\!</math> it is possible to simplify the notation for local flags in a couple of ways.  First, it is often easier in the dyadic case to refer to <math>L_{u \,\text{at}\, 1}\!</math> as <math>L_{u \,\text{at}\, X}\!</math> and <math>L_{v \,\text{at}\, 2}\!</math> as <math>L_{v \,\text{at}\, Y}.\!</math>  Second, the notation may be streamlined even further by writing <math>L_{u \,\text{at}\, 1}\!</math> as <math>u \star L\!</math> and <math>L_{v \,\text{at}\, 2}\!</math> as <math>L \star v.\!</math>
to abstract the logic of relations from the logic of relatives, and thus
 
to forge a possible link between the syntax of relative terms and the
 
more graphical depiction of the objective relations themselves.
 
  
Figure 5 demonstrates this possibility, posing a transitional case between
+
In light of these considerations, the local flags of a dyadic relation <math>L \subseteq X \times Y\!</math> may be formulated as follows:
the style of syntax in Figure 1 and the picture of composition in Figure 4.
 
  
o-----------------------------------------------------------o
+
{| align="center" cellspacing="6" width="90%"
|                                                          |
+
|
|                          L o S                          |
+
<math>\begin{array}{lll}
|                ____________@____________                |
+
u \star L
|                /                        \               |
+
& = &
|              /      L             S      \              |
+
L_{u \,\text{at}\, X}
|              /      @            @      \              |
+
\\[6pt]
|            /      / \           / \       \             |
+
& = &
|            /      /  \        /  \       \           |
+
\{ (u, y) \in L \}
|          o      o    o      o    o      o          |
+
\\[6pt]
|          X      X    Y      Y    Z      Z          |
+
& = &
|      1,__#      #'l'__$      $'s'__%      %1          |
+
\text{the ordered pairs in}~ L ~\text{that are incident with}~ u \in X.
|          o      o    o      o    o      o          |
+
\\[9pt]
|            \     /      \     /      \     /            |
+
L \star v
|            \   /        \   /        \   /            |
+
& = &
|              \ /          \ /          \ /              |
+
L_{v \,\text{at}\, Y}
|              @            @            @              |
+
\\[6pt]
|              !1!          !1!          !1!              |
+
& = &
|                                                          |
+
\{ (x, v) \in L \}
o-----------------------------------------------------------o
+
\\[6pt]
Figure 5.  Anything that is a Lover of a Servant of Anything
+
& = &
 
+
\text{the ordered pairs in}~ L ~\text{that are incident with}~ v \in Y.
In this composite sketch, the diagonal extension of the universe 1
+
\end{array}\!</math>
is invoked up front to anchor an explicit line of identity for the
+
|}
leading relate of the composition, while the terminal argument "w"
 
has been generalized to the whole universe 1, in effect, executing
 
an act of abstraction.  This type of universal bracketing isolates
 
the composing of the relations L and S to form the composite L o S.
 
The three relational domains X, Y, Z may be distinguished from one
 
another, or else rolled up into a single universe of discourse, as
 
one prefers.
 
  
 +
The following definitions are also useful:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
u \cdot L
 +
& = &
 +
\mathrm{proj}_2 (u \star L)
 +
\\[6pt]
 +
& = &
 +
\{ y \in Y : (u, y) \in L \}
 +
\\[6pt]
 +
& = &
 +
\text{the elements of}~ Y ~\text{that are}~ L\text{-related to}~ u.
 +
\\[9pt]
 +
L \cdot v
 +
& = &
 +
\mathrm{proj}_1 (L \star v)
 +
\\[6pt]
 +
& = &
 +
\{ x \in X : (x, v) \in L \}
 +
\\[6pt]
 +
& = &
 +
\text{the elements of}~ X ~\text{that are}~ L\text{-related to}~ v.
 +
\end{array}\!</math>
 +
|}
  
LOR. Commentary Note 10.4
+
A sufficient illustration is supplied by the earlier example <math>E.\!</math>
  
 +
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 30.jpg]] || (35)
 +
|}
  
 +
The local flag <math>E_{3 \,\text{at}\, X}\!</math> is displayed here:
  
From now on I will use the forms of analysis exemplified in the last set of
+
{| align="center" cellpadding="10"
Figures and Tables as a routine bridge between the logic of relative terms
+
| [[Image:LOR 1870 Figure 36 ISW.jpg]] || (36)
and the logic of their extended relations.  For future reference, we may
+
|}
think of Table 3 as illustrating the "solitaire" or "spreadsheet" model
 
of relational composition, while Figure 4 may be thought of as making
 
a start toward the "hyper(di)graph" model of generalized compositions.
 
I will explain the hypergraph model in some detail at a later point.
 
The transitional form of analysis represented by Figure 5 may be
 
called the "universal bracketing" of relatives as relations.
 
  
 +
The local flag <math>E_{2 \,\text{at}\, Y}\!</math> is displayed here:
  
 +
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 37 ISW.jpg]] || (37)
 +
|}
  
LOR.  Commentary Note 10.5
+
===Commentary Note 11.8===
  
 +
Next let's re-examine the ''numerical incidence properties'' of relations, concentrating on the definitions of the assorted regularity conditions.
  
 +
For example, <math>L\!</math> is said to be <math>{}^{\backprime\backprime} c\text{-regular at}~ j \, {}^{\prime\prime}\!</math> if and only if the cardinality of the local flag <math>L_{x \,\text{at}\, j}\!</math> is equal to <math>c\!</math> for all <math>x \in X_j,\!</math> coded in symbols, if and only if <math>|L_{x \,\text{at}\, j}| = c\!</math> for all <math>{x \in X_j}.\!</math>
  
We have sufficiently covered the application of the comma functor,
+
In a similar fashion, it is possible to define the numerical incidence properties <math>{}^{\backprime\backprime}(< c)\text{-regular at}~ j \, {}^{\prime\prime},\!</math> <math>{}^{\backprime\backprime}(> c)\text{-regular at}~ j \, {}^{\prime\prime},\!</math> and so on. For ease of reference, a few of these definitions are recorded below.
or the diagonal extension, to absolute terms, so let us return to
 
where we were in working our way through CP 3.73, and see whether
 
we can validate Peirce's statements about the "commifications" of
 
2-adic relative terms that yield their 3-adic diagonal extensions.
 
  
| But not only may any absolute term be thus regarded as
+
{| align="center" cellspacing="6" width="90%"
| a relative term, but any relative term may in the same
 
| way be regarded as a relative with one correlate more.
 
| It is convenient to take this additional correlate as
 
| the first one.
 
|
 
| Then:
 
 
|
 
|
| 'l','s'w
+
<math>\begin{array}{lll}
|
+
L ~\text{is}~ c\text{-regular at}~ j
| will denote a lover of a woman
+
& \iff &
| that is a servant of that woman.
+
|L_{x \,\text{at}\, j}| = c ~\text{for all}~ x \in X_j.
|
+
\\[6pt]
| The comma here after 'l' should not be considered
+
L ~\text{is}~ (< c)\text{-regular at}~ j
| as altering at all the meaning of 'l', but as only
+
& \iff &
| a subjacent sign, serving to alter the arrangement
+
|L_{x \,\text{at}\, j}| < c ~\text{for all}~ x \in X_j.
| of the correlates.
+
\\[6pt]
|
+
L ~\text{is}~ (> c)\text{-regular at}~ j
| C.S. Peirce, CP 3.73
+
& \iff &
 +
|L_{x \,\text{at}\, j}| > c ~\text{for all}~ x \in X_j.
 +
\\[6pt]
 +
L ~\text{is}~ (\le c)\text{-regular at}~ j
 +
& \iff &
 +
|L_{x \,\text{at}\, j}| \le c ~\text{for all}~ x \in X_j.
 +
\\[6pt]
 +
L ~\text{is}~ (\ge c)\text{-regular at}~ j
 +
& \iff &
 +
|L_{x \,\text{at}\, j}| \ge c ~\text{for all}~ x \in X_j.
 +
\end{array}\!</math>
 +
|}
  
Just to plant our feet on a more solid stage,
+
Clearly, if any relation is <math>(\le c)\text{-regular}\!</math> on one of its domains <math>X_j~\!</math> and also <math>(\ge c)\text{-regular}\!</math> on the same domain, then it must be <math>(= c)\text{-regular}\!</math> on that domain, in effect, <math>c\text{-regular}\!</math> at <math>j.\!</math>
let's apply this idea to the Othello example.
 
  
For this performance only, just to make the example more interesting,
+
For example, let <math>G = \{ r, s, t \}\!</math> and <math>H = \{ 1, \ldots, 9 \},\!</math> and consider the dyadic relation <math>F \subseteq G \times H\!</math> that is bigraphed here:
let us assume that Jeste (J) is secretly in love with Desdemona (D).
 
  
Then we begin with the modified data set:
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 38.jpg]] || (38)
 +
|}
  
w  =  "woman"          =  B +, D +, E
+
We observe that <math>F\!</math> is 3-regular at <math>G\!</math> and 1-regular at <math>H.\!</math>
  
'l'  = "lover of ---"    = B:C +, C:B +, D:O +, E:I +, I:E +, J:D +, O:D
+
===Commentary Note 11.9===
  
's'  =  "servant of ---"  =  C:O +, E:D +, I:O +, J:D +, J:O
+
Among the variety of conceivable regularities affecting dyadic relations we pay special attention to the <math>c\!</math>-regularity conditions where <math>c\!</math> is equal to 1.
  
And next we derive the following results:
+
Let <math>P \subseteq X \times Y\!</math> be an arbitrary dyadic relation.  The following properties of <math>P\!</math> can be defined:
  
'l',  = "lover that is --- of ---"
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
P ~\text{is total at}~ X
 +
& \iff &
 +
P ~\text{is}~ (\ge 1)\text{-regular}~ \text{at}~ X.
 +
\\[6pt]
 +
P ~\text{is total at}~ Y
 +
& \iff &
 +
P ~\text{is}~ (\ge 1)\text{-regular}~ \text{at}~ Y.
 +
\\[6pt]
 +
P ~\text{is tubular at}~ X
 +
& \iff &
 +
P ~\text{is}~ (\le 1)\text{-regular}~ \text{at}~ X.
 +
\\[6pt]
 +
P ~\text{is tubular at}~ Y
 +
& \iff &
 +
P ~\text{is}~ (\le 1)\text{-regular}~ \text{at}~ Y.
 +
\end{array}\!</math>
 +
|}
  
      = B:B:C +, C:C:B +, D:D:O +, E:E:I +, I:I:E +, J:J:D +, O:O:D
+
We have already looked at dyadic relations that separately exemplify each of these regularities. We also introduced a few bits of additional terminology and special-purpose notations for working with tubular relations:
  
'l','s'w  = (B:B:C +, C:C:B +, D:D:O +, E:E:I +, I:I:E +, J:J:D +, O:O:D)
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
P ~\text{is a pre-function}~ P : X \rightharpoonup Y
 +
& \iff &
 +
P ~\text{is tubular at}~ X.
 +
\\[6pt]
 +
P ~\text{is a pre-function}~ P : X \leftharpoonup Y
 +
& \iff &
 +
P ~\text{is tubular at}~ Y.
 +
\end{array}\!</math>
 +
|}
  
          x  (C:O +, E:D +, I:O +, J:D +, J:O)
+
We arrive by way of this winding stair at the special stamps of dyadic relations <math>P \subseteq X \times Y\!</math> that are variously described as ''1-regular'', ''total and tubular'', or ''total prefunctions'' on specified domains, either <math>X\!</math> or <math>Y\!</math> or both, and that are more often celebrated as ''functions'' on those domains.
  
          x  (B +, D +, E)
+
If <math>P\!</math> is a pre-function <math>P : X \rightharpoonup Y\!</math> that happens to be total at <math>X,\!</math> then <math>P\!</math> is known as a ''function'' from <math>X\!</math> to <math>Y,\!</math> typically indicated as <math>{P : X \to Y}.\!</math>
  
Now what are we to make of that?
+
To say that a relation <math>P \subseteq X \times Y\!</math> is ''totally tubular'' at <math>X\!</math> is to say that <math>P\!</math> is 1-regular at <math>X.\!</math>  Thus, we may formalize the following definitions:
  
If we operate in accordance with Peirce's example of `g`'o'h
+
{| align="center" cellspacing="6" width="90%"
as the "giver of a horse to an owner of that horse", then we
+
|
may assume that the associative law and the distributive law
+
<math>\begin{array}{lll}
are by default in force, allowing us to derive this equation:
+
P ~\text{is a function}~ P : X \to Y
 +
& \iff &
 +
P ~\text{is}~ 1\text{-regular at}~ X.
 +
\\[6pt]
 +
P ~\text{is a function}~ P : X \leftarrow Y
 +
& \iff &
 +
P ~\text{is}~ 1\text{-regular at}~ Y.
 +
\end{array}\!</math>
 +
|}
  
'l','s'w  = 'l','s'(B +, D +, E)
+
For example, let <math>X = Y = \{ 0, \ldots, 9 \}\!</math> and let <math>F \subseteq X \times Y\!</math> be the dyadic relation depicted in the bigraph below:
  
          = 'l','s'B +, 'l','s'D +, 'l','s'E
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 39.jpg]] || (39)
 +
|}
  
Evidently what Peirce means by the associative principle,
+
We observe that <math>F\!</math> is a function at <math>Y\!</math> and we record this fact in either of the manners <math>F : X \leftarrow Y\!</math> or <math>F : Y \to X.\!</math>
as it applies to this type of product, is that a product
 
of elementary relatives having the form (R:S:T)(S:T)(T)
 
is equal to R but that no other form of product yields
 
a non-null result. Scanning the implied terms of the
 
triple product tells us that only the following case
 
is non-null:  J = (J:J:D)(J:D)(D).  It follows that:
 
  
'l','s'w  = "lover and servant of a woman"
+
===Commentary Note 11.10===
  
          =  "lover that is a servant of a woman"
+
In the case of a dyadic relation <math>F \subseteq X \times Y\!</math> that has the qualifications of a function <math>f : X \to Y,\!</math> there are a number of further differentia that arise:
  
          "lover of a woman that is a servant of that woman"
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
f ~\text{is surjective} & \iff & f ~\text{is total at}~ Y.
 +
\\[6pt]
 +
f ~\text{is injective}  & \iff & f ~\text{is tubular at}~ Y.
 +
\\[6pt]
 +
f ~\text{is bijective} & \iff & f ~\text{is}~ 1\text{-regular at}~ Y.
 +
\end{array}\!</math>
 +
|}
  
          =  J
+
For example, the function <math>f : X \to Y\!</math> depicted below is neither total at <math>Y\!</math> nor tubular at <math>Y,\!</math> and so it cannot enjoy any of the properties of being surjective, injective, or bijective.
  
And so what Peirce says makes sense in this case.
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 40.jpg]] || (40)
 +
|}
  
 +
An easy way to extract a surjective function from any function is to reset its codomain to its range.  For example, the range of the function <math>f\!</math> above is <math>Y^\prime = \{ 0, 2, 5, 6, 7, 8, 9 \}.\!</math>  Thus, if we form a new function <math>g : X \to Y^\prime\!</math> that looks just like <math>f\!</math> on the domain <math>X\!</math> but is assigned the codomain <math>Y^\prime,\!</math> then <math>g\!</math> is surjective, and is described as mapping ''onto'' <math>Y^\prime.\!</math>
  
 +
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 41.jpg]] || (41)
 +
|}
  
LOR. Commentary Note 10.6
+
The function <math>h : Y^\prime \to Y\!</math> is injective.
  
 +
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 42.jpg]] || (42)
 +
|}
  
 +
The function <math>m : X \to Y\!</math> is bijective.
  
As Peirce observes, it is not possible to work with
+
{| align="center" cellpadding="10"
relations in general without eventually abandoning
+
| [[Image:LOR 1870 Figure 43.jpg]] || (43)
all of one's algebraic principles, in due time the
+
|}
associative and maybe even the distributive, just
 
as we have already left behind the commutative.
 
It cannot be helped, as we cannot reflect on
 
a law if not from a perspective outside it,
 
that is to say, at any rate, virtually so.
 
  
One way to do this would be from the standpoint of the combinator calculus,
+
===Commentary Note 11.11===
and there are places where Peirce verges on systems that are very similar,
 
but I am making a deliberate effort to remain here as close as possible
 
within the syntactoplastic chronism of his 1870 Logic of Relatives.
 
So let us make use of the smoother transitions that are afforded
 
by the paradigmatic Figures and Tables that I drew up earlier.
 
  
For the next few episodes, then, I will examine the examples
+
The preceding exercises were intended to beef-up our &ldquo;functional&rdquo; literacy skills to the point where we can read our functional alphabets backwards and forwards and recognize the local functionalities that may be immanent in relative terms no matter where they locate themselves within the domains of relations.  These skills will serve us in good stead as we work to build a catwalk from Peirce's platform of 1870 to contemporary scenes on the logic of relatives, and back again.
that Peirce gives at the next level of complication in the
 
multiplication of relative terms, for instance, the three
 
that I have redrawn below.
 
  
o-------------------------------------------------o
+
By way of extending a few very tentative planks, let us experiment with the following definitions:
|                                                |
 
|                                                |
 
|        `g`__$__%    $'l'__*  *w  %h          |
 
|              o  o    o    o  o    o          |
 
|              \  \  /      \ /    /            |
 
|                \  \/        @    /            |
 
|                \ /\______ ______/              |
 
|                  @        @                    |
 
|                                                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 6.  Giver of a Horse to a Lover of a Woman
 
  
o-------------------------------------------------o
+
{| align="center" cellspacing="6" width="90%"
|                                                |
+
|
|                                                |
+
<p>A relative term <math>p\!</math> and the corresponding relation <math>P \subseteq X \times Y\!</math> are both called ''functional on relates'' if and only if <math>P\!</math> is a function at <math>X,\!</math> in&nbsp;symbols, <math>{P : X \to Y}.\!</math></p>
|        `g`__$__%    $'o'__*  *%h              |
+
|-
|              o  o    o    o  oo              |
+
|
|              \ \ /       \ //               |
+
<p>A relative term <math>p\!</math> and the corresponding relation <math>P \subseteq X \times Y\!</math> are both called ''functional on correlates'' if and only if <math>P\!</math> is a function at <math>Y,\!</math> in&nbsp;symbols, <math>P : X \leftarrow Y.\!</math></p>
|               \ \/         @/                 |
+
|}
|                \ /\____ ____/                 |
 
|                 @      @                      |
 
|                                                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 7.  Giver of a Horse to an Owner of It
 
  
o-------------------------------------------------o
+
When a relation happens to be a function, it may be excusable to use the same name for it in both applications, writing out explicit type markers like <math>P : X \times Y,\!</math> &nbsp; <math>P : X \to Y,\!</math> &nbsp; <math>P : X \leftarrow Y,\!</math> as the case may be, when and if it serves to clarify matters.
|                                                |
 
|                                                |
 
|        'l',__$__%    $'s'__*  *%w              |
 
|              o  o    o    o  oo              |
 
|              \ \ /       \ //                |
 
|                \  \/         @/                |
 
|                \ /\____ ____/                 |
 
|                  @      @                      |
 
|                                                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 8. Lover that is a Servant of a Woman
 
  
 +
From this current, perhaps transient, perspective, it appears that our next task is to examine how the known properties of relations are modified when an aspect of functionality is spied in the mix.  Let us then return to our various ways of looking at relational composition, and see what changes and what stays the same when the relations in question happen to be functions of various different kinds at some of their domains.  Here is one generic picture of relational composition, cast in a style that hews pretty close to the line of potentials inherent in Peirce's syntax of this period.
  
 +
<br>
  
LOR. Commentary Note 10.7
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 44.jpg]] || (44)
 +
|}
  
 +
From this we extract the ''hypergraph picture'' of relational composition:
  
 +
<br>
  
Here is what I get when I try to analyze Peirce's
+
{| align="center" cellpadding="10"
"giver of a horse to a lover of a woman" example
+
| [[Image:LOR 1870 Figure 45.jpg]] || (45)
along the same lines as the 2-adic compositions.
+
|}
  
We may begin with the mark-up shown in Figure 6.
+
All of the relevant information of these Figures can be compressed into the form of a spreadsheet, or constraint satisfaction table:
  
o-------------------------------------------------o
+
<br>
|                                                |
 
|                                                |
 
|        `g`__$__%    $'l'__*  *w  %h          |
 
|              o  o    o    o  o    o          |
 
|              \  \  /      \ /    /            |
 
|                \  \/        @    /            |
 
|                \ /\______ ______/              |
 
|                  @        @                    |
 
|                                                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 6.  Giver of a Horse to a Lover of a Woman
 
  
If we analyze this in accord with the "spreadsheet" model
+
{| align="center" cellpadding="10" cellspacing="0" style="border-left:1px solid black; border-top:1px solid black; border-right:1px solid black; border-bottom:1px solid black; text-align:center; width:60%"
of relational composition, the core of it is a particular
+
|+ style="height:30px" | <math>\text{Table 46.} ~~ \text{Relational Composition}~ P \circ Q\!</math>
way of composing a 3-adic "giving" relation G c T x U x V
+
|-
with a 2-adic "loving" relation L c U x W so as to obtain
+
| style="border-right:1px solid black; border-bottom:1px solid black; width:25%" | &nbsp;
a specialized sort of 3-adic relation (G o L) c T x W x V.
+
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
The applicable constraints on tuples are shown in Table 9.
+
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>\mathit{1}\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>P\!</math>
 +
| <math>X\!</math>
 +
| <math>Y\!</math>
 +
| &nbsp;
 +
|-
 +
| style="border-right:1px solid black" | <math>Q\!</math>
 +
| &nbsp;
 +
| <math>Y\!</math>
 +
| <math>Z\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>P \circ Q</math>
 +
| <math>X\!</math>
 +
| &nbsp;
 +
| <math>Z\!</math>
 +
|}
  
Table 9.  Composite of Triadic and Dyadic Relations
+
<br>
o---------o---------o---------o---------o---------o
 
|        #  !1!  |  !1!  |  !1!  |  !1!  |
 
o=========o=========o=========o=========o=========o
 
|    G    #    T    |    U    |        |    V    |
 
o---------o---------o---------o---------o---------o
 
|    L    #        |    U    |    W    |        |
 
o---------o---------o---------o---------o---------o
 
|  G o L  #    T    |        |    W    |    V    |
 
o---------o---------o---------o---------o---------o
 
  
The hypergraph picture of the abstract composition is given in Figure 10.
+
So the following presents itself as a reasonable plan of study:  Let's see how much easy mileage we can get in our exploration of functions by adopting the above templates as a paradigm.
  
o---------------------------------------------------------------------o
+
===Commentary Note 11.12===
|                                                                    |
 
|                                G o L                                |
 
|                      ___________@___________                      |
 
|                      /                  \    \                      |
 
|                    /  G              L  \    \                    |
 
|                    /  @              @  \    \                    |
 
|                  /  /|\            / \  \    \                  |
 
|                  /  / | \          /  \  \    \                  |
 
|                /  /  |  \        /    \  \    \                |
 
|                /  /  |  \      /      \  \    \                |
 
|              o  o    o    o    o        o  o    o              |
 
|              T  T    U    V    U        W  W    V              |
 
|            1,_#  #`g`_$____%    $'l'______*  *1  %1              |
 
|              o  o    o    o    o        o  o    o              |
 
|                \ /      \    \  /          \ /    /                |
 
|                @        \    \/            @    /                |
 
|                !1!        \  /\            !1!  /                  |
 
|                            \ /  \_______ _______/                  |
 
|                            @          @                          |
 
|                            !1!        !1!                          |
 
|                                                                    |
 
o---------------------------------------------------------------------o
 
Figure 10. Anything that is a Giver of Anything to a Lover of Anything
 
  
 +
Since functions are special cases of dyadic relations and since the space of dyadic relations is closed under relational composition &mdash; that is, the composition of two dyadic relations is again a dyadic relation &mdash; we know that the relational composition of two functions has to be a dyadic relation.  If the relational composition of two functions is necessarily a function, too, then we would be justified in speaking  of ''functional composition'' and also in saying that the space of functions is closed under this functional form of composition.
  
 +
Just for novelty's sake, let's try to prove this for relations that are functional on correlates.
  
LOR.  Commentary Note 10.8
+
The task is this &mdash; We are given a pair of dyadic relations:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| <math>P \subseteq X \times Y \quad \text{and} \quad Q \subseteq Y \times Z\!</math>
 +
|}
  
 +
<math>P\!</math> and <math>Q\!</math> are assumed to be functional on correlates, a premiss that we express as follows:
  
In taking up the next example of relational composition,
+
{| align="center" cellspacing="6" width="90%"
let's exchange the relation 't' = "trainer of ---" for
+
| <math>P : X \gets Y \quad \text{and} \quad Q : Y \gets Z\!</math>
Peirce's relation 'o' = "owner of ---", simply for the
+
|}
sake of avoiding conflicts in the symbols that we use.
 
In this way, Figure 7 is transformed into Figure 11.
 
  
o-------------------------------------------------o
+
We are charged with deciding whether the relational composition <math>P \circ Q \subseteq X \times Z\!</math> is also functional on correlates, in symbols, whether <math>{P \circ Q : X \gets Z}.\!</math>
|                                                |
 
|                                                |
 
|        `g`__$__%    $'t'__*  *%h              |
 
|              o  o    o    o  oo              |
 
|              \ \ /      \ //                |
 
|                \ \/        @/                |
 
|                \ /\____ ____/                 |
 
|                  @      @                      |
 
|                                                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 11.  Giver of a Horse to a Trainer of It
 
  
Now here's an interesting point, in fact, a critical transition point,
+
It always helps to begin by recalling the pertinent definitions.
that we see resting in potential but a stone's throw removed from the
 
chronism, the secular neigborhood, the temporal vicinity of Peirce's
 
1870 LOR, and it's a vertex that turns on the teridentity relation.
 
  
The hypergraph picture of the abstract composition is given in Figure 12.
+
For a dyadic relation <math>L \subseteq X \times Y,\!</math> we have:
  
o---------------------------------------------------------------------o
+
{| align="center" cellspacing="6" width="90%"
|                                                                    |
+
|
|                                G o T                                |
+
<math>\begin{array}{lll}
|                _________________@_________________                |
+
L ~\text{is a function}~ L : X \gets Y
|                /                                  \               |
+
& \iff &
|              /        G              T            \               |
+
L ~\text{is}~ 1\text{-regular at}~ Y.
|              /        @              @              \             |
+
\end{array}</math>
|            /        /|\            / \              \            |
+
|}
|            /        / | \          /  \              \            |
 
|          /        /  |  \        /    \              \           |
 
|          /        /  |  \     /      \             \          |
 
|        o        o    o    o    o        o              o        |
 
|        X        X    Y   Z    Y        Z              Z        |
 
|      1,_#        #`g`_$____%    $'t'______%              %1        |
 
|        o        o    o    o    o        o              o        |
 
|          \      /      \    \  /          |            /          |
 
|          \    /        \    \/          |            /          |
 
|            \  /          \  /\          |          /            |
 
|            \ /            \ /  \__________|__________/             |
 
|              @              @              @                        |
 
|             !1!            !1!            !1!                      |
 
|                                                                    |
 
o---------------------------------------------------------------------o
 
Figure 12.  Anything that is a Giver of Anything to a Trainer of It
 
  
If we analyze this in accord with the "spreadsheet" model
+
As for the definition of relational composition, it is enough to consider the coefficient of the composite relation on an arbitrary ordered pair, <math>i\!:\!j.</math>  For that, we have the following formula, where the summation indicated is logical disjunction:
of relational composition, the core of it is a particular
 
way of composing a 3-adic "giving" relation G c X x Y x Z
 
with a 2-adic "training" relation T c Y x Z in such a way
 
as to determine a certain 2-adic relation (G o T) c X x Z.
 
Table 13 schematizes the associated constraints on tuples.
 
  
Table 13.  Another Brand of Composition
+
{| align="center" cellspacing="6" width="90%"
o---------o---------o---------o---------o
+
| <math>(P \circ Q)_{ij} ~=~ \sum_k P_{ik} Q_{kj}\!</math>
|        #  !1!  |  !1!  |  !1!  |
+
|}
o=========o=========o=========o=========o
 
|   G    #    X    |    Y    |    Z    |
 
o---------o---------o---------o---------o
 
|   T    #        |    Y    |    Z    |
 
o---------o---------o---------o---------o
 
|  G o T  #    X    |        |    Z    |
 
o---------o---------o---------o---------o
 
  
So we see that the notorious teridentity relation,
+
So let's begin.
which I have left equivocally denoted by the same
 
symbol as the identity relation !1!, is already
 
implicit in Peirce's discussion at this point.
 
  
 +
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<p><math>P : X \gets Y,\!</math> or the fact that <math>P ~\text{is}~ 1\text{-regular at}~ Y,\!</math> means that there is exactly one ordered pair <math>i\!:\!k \in P</math> for each <math>k \in Y.\!</math></p>
 +
|-
 +
|
 +
<p><math>Q : Y \gets Z,\!</math> or the fact that <math>Q ~\text{is}~ 1\text{-regular at}~ Z,\!</math> means that there is exactly one ordered pair <math>k\!:\!j \in Q</math> for each <math>j \in Z.\!</math></p>
 +
|-
 +
|
 +
<p>As a result, there is exactly one ordered pair <math>i\!:\!j \in P \circ Q</math> for each <math>j \in Z,\!</math> which means that <math>P \circ Q ~\text{is}~ 1\text{-regular at}~ Z,\!</math> and so we have the function <math>{P \circ Q : X \gets Z}.\!</math></p>
 +
|}
  
 +
And we are done.
  
LOR.  Commentary Note 10.9
+
===Commentary Note 11.13===
  
 +
As we make our way toward the foothills of Peirce's 1870 Logic of Relatives, there are several pieces of equipment that we must not leave the plains without, namely, the utilities variously known as ''arrows'', ''morphisms'', ''homomorphisms'', ''structure-preserving maps'', among other names, depending on the altitude of abstraction we happen to be traversing at the moment in question. As a moderate to middling but not too beaten track, let's examine a few ways of defining morphisms that will serve us in the present discussion.
  
 +
Suppose we are given three functions <math>J, K, L~\!</math> that satisfy the following conditions:
  
The use of the concepts of identity and teridentity is not to identify
+
{| align="center" cellspacing="6" width="90%"
a thing in itself with itself, much less twice or thrice over, since
+
|
there is no need and thus no utility in that.  I can imagine Peirce
+
<math>\begin{array}{lcccl}
asking, on Kantian principles if not entirely on Kantian premisses,
+
J & : & X & \gets & Y
"Where is the manifold to be unified?"  The manifold that demands
+
\\[6pt]
unification does not reside in the object but in the phenomena,
+
K & : & X & \gets & X \times X
that is, in the appearances that might have been appearances
+
\\[6pt]
of different objects but that happen to be constrained by
+
L & : & Y & \gets & Y \times Y
these identities to being just so many aspects, facets,
+
\end{array}</math>
parts, roles, or signs of one and the same object.
+
|-
 +
|
 +
<math>\begin{array}{lll}
 +
J(L(u, v)) & = & K(Ju, Jv)
 +
\end{array}</math>
 +
|}
  
For example, notice how the various identity concepts actually
+
Our sagittarian leitmotif can be rubricized in the following slogan:
functioned in the last example, where they had the opportunity
 
to show their behavior in something like their natural habitat.
 
  
The use of the teridentity concept in the case
+
{| align="center" cellspacing="12" width="90%"
of the "giver of a horse to a trainer of it" is
+
| <math>\textit{The~image~of~the~ligature~is~the~compound~of~the~images.}</math>
to stipulate that the thing appearing with respect
+
|-
to its quality under the aspect of an absolute term,
+
| (Where <math>J\!</math> is the ''image'', <math>K\!</math> is the ''compound'', and <math>L\!</math> is the ''ligature''.)
a horse, and the thing appearing with respect to its
+
|}
recalcitrance in the role of the correlate of a 2-adic
 
relative, a brute to be trained, and the thing appearing
 
with respect to its synthesis in the role of a correlate
 
of a 3-adic relative, a gift, are one and the same thing.
 
  
 +
Figure&nbsp;47 presents us with a picture of the situation in question.
  
 +
<br>
  
LOR. Commentary Note 10.10
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 47.jpg]] || (47)
 +
|}
  
 +
Table&nbsp;48 gives the constraint matrix version of the same thing.
  
 +
<br>
  
Figure 8 depicts the last of the three examples involving
+
{| align="center" cellpadding="10" cellspacing="0" style="border-left:1px solid black; border-top:1px solid black; border-right:1px solid black; border-bottom:1px solid black; text-align:center; width:60%"
the composition of 3-adic relatives with 2-adic relatives:
+
|+ style="height:30px" | <math>\text{Table 48.} ~~ \text{Arrow Equation:} ~~ J(L(u, v)) = K(Ju, Jv)\!</math>
 +
|-
 +
| style="border-right:1px solid black; border-bottom:1px solid black; width:25%" | &nbsp;
 +
| style="border-bottom:1px solid black; width:25%" | <math>J\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>J\!</math>
 +
| style="border-bottom:1px solid black; width:25%" | <math>J\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>K\!</math>
 +
| <math>X\!</math>
 +
| <math>X\!</math>
 +
| <math>X\!</math>
 +
|-
 +
| style="border-right:1px solid black" | <math>L\!</math>
 +
| <math>Y\!</math>
 +
| <math>Y\!</math>
 +
| <math>Y\!</math>
 +
|}
  
o-------------------------------------------------o
+
<br>
|                                                |
 
|                                                |
 
|        'l',__$__%    $'s'__*  *%w              |
 
|              o  o    o    o  oo              |
 
|              \  \  /      \ //                |
 
|                \  \/        @/                |
 
|                \ /\____ ____/                  |
 
|                  @      @                      |
 
|                                                |
 
|                                                |
 
o-------------------------------------------------o
 
Figure 8.  Lover that is a Servant of a Woman
 
  
The hypergraph picture of the abstract composition is given in Figure 14.
+
One way to read this Table is in terms of the informational redundancies that it schematizes.  In particular, it can be read to say that when one satisfies the constraint in the <math>L\!</math> row, along with all the constraints in the <math>J\!</math> columns, then the constraint in the <math>K\!</math> row is automatically true.  That is one way of understanding the equation:  <math>J(L(u, v)) ~=~ K(Ju, Jv).</math>
  
o---------------------------------------------------------------------o
+
===Commentary Note 11.14===
|                                                                    |
 
|                                L , S                                |
 
|                __________________^__________________                |
 
|              /                                    \              |
 
|              /      L_,              S              \              |
 
|            /        @              @              \            |
 
|            /        /|\            / \              \            |
 
|          /        / | \          /  \              \          |
 
|          /        /  |  \        /    \              \          |
 
|        /        /  |  \      /      \              \        |
 
|        /        /    |    \    /        \              \        |
 
|      o        o    o    o  o          o              o      |
 
|      X        X    X    Y  X          Y              Y      |
 
|    1,_#        #'l',_$_____%  $'t'________%              %1      |
 
|      o        o    o    o  o          o              o      |
 
|        \      /      \    \ /            |              /        |
 
|        \    /        \    \            |            /        |
 
|          \  /          \  / \            |            /          |
 
|          \ /            \ /  \___________|___________/          |
 
|            @              @                @                      |
 
|          !1!            !1!              !1!                      |
 
|                                                                    |
 
o---------------------------------------------------------------------o
 
Figure 14.  Anything that's a Lover of Anything and that's a Servant of It
 
  
This example illustrates the way that Peirce analyzes the logical conjunction,
+
Now, as promised, let's look at a more homely example of a morphism, say, any one of the mappings <math>J : \mathbb{R} \to \mathbb{R}\!</math> (roughly speaking) that are commonly known as ''logarithm functions'', where you get to pick your favorite base.  In this case, <math>K(r, s) = r + s~\!</math> and <math>L(u, v) = u \cdot v,\!</math> and the defining formula <math>J(L(u, v)) = K(Ju, Jv)\!</math> comes out looking like <math>J(u \cdot v) = J(u) + J(v),\!</math> writing a dot <math>(\cdot)~\!</math> and a plus sign <math>(+)\!</math> for the ordinary binary operations of arithmetical multiplication and arithmetical summation, respectively.
we might even say the "parallel conjunction", of a couple of 2-adic relatives
 
in terms of the comma extension and the same style of composition that we saw
 
in the last example, that is, according to a pattern of anaphora that invokes
 
the teridentity relation.
 
  
If we lay out this analysis of conjunction on the spreadsheet model
+
<br>
of relational composition, the gist of it is the diagonal extension
 
of a 2-adic "loving" relation L c X x Y to the corresponding 3-adic
 
"loving and being" relation L_, c X x X x Y, which is then composed
 
in a specific way with a 2-adic "serving" relation S c X x Y, so as
 
to determine the 2-adic relation L,S c X x Y.  Table 15 schematizes
 
the associated constraints on tuples.
 
  
Table 15.  Conjunction Via Composition
+
{| align="center" cellpadding="10"
o---------o---------o---------o---------o
+
| [[Image:LOR 1870 Figure 49.jpg]] || (49)
|         #  !1!  |  !1!  |  !1!  |
+
|}
o=========o=========o=========o=========o
 
|   L,  #    X    |    X    |   Y    |
 
o---------o---------o---------o---------o
 
|   S    #        |    X    |    Y    |
 
o---------o---------o---------o---------o
 
|  L , S  #    X    |        |    Y    |
 
o---------o---------o---------o---------o
 
  
 +
Thus, where the ''image'' <math>J\!</math> is the logarithm map, the ''compound'' <math>K\!</math> is the numerical sum, and the ''ligature'' <math>L\!</math> is the numerical product, one has the following rule of thumb:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<p><math>\textit{The~image~of~the~product~is~the~sum~of~the~images.}</math></p>
 +
|-
 +
|
 +
<math>\begin{array}{lll}
 +
J(u \cdot v) & = & J(u) + J(v)
 +
\\[12pt]
 +
J(L(u, v)) & = & K(Ju, Jv)
 +
\end{array}</math>
 +
|}
  
LOR.  Commentary Note 10.11
+
===Commentary Note 11.15===
  
 +
I'm going to elaborate a little further on the subject of arrows, morphisms, or structure-preserving maps, as a modest amount of extra work at this point will repay ample dividends when it comes time to revisit Peirce's &ldquo;number of&rdquo; function on logical terms.
  
 +
The ''structure'' that is preserved by a structure-preserving map is just the structure that we all know and love as a triadic relation.  Very typically, it will be the type of triadic relation that defines the type of binary operation that obeys the rules of a mathematical structure that is known as a ''group'', that is, a structure that satisfies the axioms for closure, associativity, identities, and inverses.
  
I return to where we were in unpacking the contents of CP 3.73.
+
For example, in the previous case of the logarithm map <math>J,\!</math> we have the data:
Peirce remarks that the comma operator can be iterated at will:
 
  
| In point of fact, since a comma may be added in this way to any
+
{| align="center" cellspacing="6" width="90%"
| relative term, it may be added to one of these very relatives
 
| formed by a comma, and thus by the addition of two commas
 
| an absolute term becomes a relative of two correlates.
 
 
|
 
|
| So:
+
<math>\begin{array}{lcccll}
|
+
J & : & \mathbb{R} & \gets & \mathbb{R}
| m,,b,r
+
& \text{(properly restricted)}
|
+
\\[6pt]
| interpreted like
+
K & : & \mathbb{R} & \gets & \mathbb{R} \times \mathbb{R}
|
+
& \text{where}~ K(r, s) = r + s
| `g`'o'h
+
\\[6pt]
|
+
L & : & \mathbb{R} & \gets & \mathbb{R} \times \mathbb{R}
| means a man that is a rich individual and
+
& \text{where}~ L(u, v) = u \cdot v
| is a black that is that rich individual.
+
\end{array}</math>
|
+
|}
| But this has no other meaning than:
 
|
 
| m,b,r
 
|
 
| or a man that is a black that is rich.
 
|
 
| Thus we see that, after one comma is added, the
 
| addition of another does not change the meaning
 
| at all, so that whatever has one comma after it
 
| must be regarded as having an infinite number.
 
|
 
| C.S. Peirce, CP 3.73
 
  
Again, let us check whether this makes sense
+
Real number addition and real number multiplication (suitably restricted) are examples of group operations.  If we write the sign of each operation in braces as a name for the triadic relation that constitutes or defines the corresponding group, then we have the following set-up:
on the stage of our small but dramatic model.
 
  
Let's say that Desdemona and Othello are rich,
+
{| align="center" cellspacing="6" width="90%"
and, among the persons of the play, only they.
+
|
 +
<math>\begin{matrix}
 +
J
 +
& : &
 +
[+] \gets [\,\cdot\,]
 +
\\[6pt]
 +
[+]
 +
& \subseteq &
 +
\mathbb{R} \times \mathbb{R} \times \mathbb{R}
 +
\\[6pt]
 +
[\,\cdot\,]
 +
& \subseteq &
 +
\mathbb{R} \times \mathbb{R} \times \mathbb{R}
 +
\end{matrix}</math>
 +
|}
  
With this premiss we obtain a sample of absolute terms
+
In many cases, one finds that both group operations are indicated by the same sign, typically &nbsp;<math>\cdot\!</math>&nbsp;, &nbsp;<math>*\!</math>&nbsp;, &nbsp;<math>+\!</math>&nbsp;, or simple concatenation, but they remain in general distinct whether considered as operations or as relations, no matter what signs of operation are used.  In such a setting, our chiasmatic theme may run a bit like these two variants:
that is sufficiently ample to work through our example:
 
  
1    =   B +, C +, D +, E +, I +, J +, O
+
{| align="center" cellspacing="6" width="90%"
 +
| <p><math>\textit{The~image~of~the~sum~is~the~sum~of~the~images.}</math></p>
 +
|-
 +
| <p><math>\textit{The~image~of~the~product~is~the~sum~of~the~images.}</math></p>
 +
|}
  
b    =  O
+
Figure&nbsp;50 presents a generic picture for groups <math>G\!</math> and <math>H.\!</math>
  
m    =  C +, I +, J +, O
+
<br>
  
r    =   D +, O
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 50.jpg]] || (50)
 +
|}
  
One application of the comma operator
+
In a setting where both groups are written with a plus sign, perhaps even constituting the very same group, the defining formula of a morphism, <math>J(L(u, v)) = K(Ju, Jv),\!</math> takes on the shape <math>J(u + v) = Ju + Jv,\!</math> which looks very analogous to the distributive multiplication of a sum <math>(u + v)\!</math> by a factor <math>J.\!</math>  Hence another popular name for a morphism: a ''linear'' map.
yields the following 2-adic relatives:
 
  
1,  =   B:B +, C:C +, D:D +, E:E +, I:I +, J:J +, O:O
+
===Commentary Note 11.16===
  
b,   =  O:O
+
We have enough material on morphisms now to go back and cast a more studied eye on what Peirce is doing with that &ldquo;number&nbsp;of&rdquo; function, whose application to a logical term <math>t\!</math> is indicated by writing the term in square brackets, as <math>[t].\!</math>  It is convenient to have a prefix notation for the function that maps a term <math>t\!</math> to a number <math>[t]\!</math> but Peirce has previously reserved <math>\mathit{n}\!</math> for the logical <math>\mathrm{not},\!</math> so let's use <math>v(t)\!</math> as a variant for <math>[t].\!</math>
  
m,   =  C:C +, I:I +, J:J +, O:O
+
My plan will be nothing less plodding than to work through the statements that Peirce made in defining and explaining the &ldquo;number&nbsp;of&rdquo; function up to our present place in the paper, namely, the budget of points collected in [[Peirce%27s_1870_Logic_Of_Relatives#Commentary_Note_11.2|Section 11.2]].
  
r,  =  D:D +, O:O
+
'''NOF 1'''
  
Another application of the comma operator
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
generates the following 3-adic relatives:
+
|
 +
<p>I propose to assign to all logical terms, numbers;  to an absolute term, the number of individuals it denotes;  to a relative term, the average number of things so related to one individual.  Thus in a universe of perfect men (''men''), the number of &ldquo;tooth of&rdquo; would be 32.  The number of a relative with two correlates would be the average number of things so related to a pair of individuals;  and so on for relatives of higher numbers of correlates.  I propose to denote the number of a logical term by enclosing the term in square brackets, thus <math>[t].\!</math></p>
  
1,,  =  B:B:B +, C:C:C +, D:D:D +, E:E:E +, I:I:I +, J:J:J +, O:O:O
+
<p>(Peirce, CP 3.65).</p>
 +
|}
  
b,, =  O:O:O
+
The role of the &ldquo;number&nbsp;of&rdquo; function may be formalized by assigning it a name and a type as <math>v : S \to \mathbb{R},\!</math> where <math>S\!</math> is a suitable set of signs, a ''>syntactic domain'', containing all the logical terms whose numbers we need to evaluate in a given discussion, and where <math>\mathbb{R}\!</math> is the set of real numbers.
  
m,,  =  C:C:C +, I:I:I +, J:J:J +, O:O:O
+
Transcribing Peirce's example:
  
r,=   D:D:D +, O:O:O
+
{| width="100%"
 +
| width="10%" | Let
 +
| <math>\mathrm{m} = \text{man}\!</math>
 +
| width="10%" | &nbsp;
 +
|-
 +
| &nbsp;
 +
|-
 +
| and
 +
| <math>\mathit{t} = \text{tooth of}\,\underline{~~ ~~}.</math>
 +
| &nbsp;
 +
|-
 +
| &nbsp;
 +
|-
 +
| Then
 +
| <math>v(\mathit{t}) ~=~ [\mathit{t}] ~=~ \frac{[\mathit{t}\mathrm{m}]}{[\mathrm{m}]}.\!</math>
 +
| &nbsp;
 +
|}
  
Assuming the associativity of multiplication among 2-adic relatives,
+
Thus, in a universe of perfect human dentition, the number of the relative term <math>{}^{\backprime\backprime} \text{tooth of}\,\underline{~~ ~~} {}^{\prime\prime}\!</math> is equal to the number of teeth of humans divided by the number of humans, that is, <math>32.\!</math>
we may compute the product m,b,r by a brute force method as follows:
 
  
m,b,r  =  (C:C +, I:I +, J:J +, O:O)(O:O)(D +, O)
+
The dyadic relative term <math>t\!</math> determines a dyadic relation <math>T \subseteq X \times Y,</math> where <math>X\!</math> contains all the teeth and <math>Y\!</math> contains all the people that happen to be under discussion.
  
      =  (C:C +, I:I +, J:J +, O:O)(O)
+
A rough indication of the bigraph for <math>T\!</math> might be drawn as follows, showing just the first few items in the toothy part of <math>X\!</math> and the peoply part of <math>Y.\!</math>
  
      = O
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 51.jpg]] || (51)
 +
|}
  
This avers that a man that is black that is rich is Othello,
+
Notice that the &ldquo;number&nbsp;of&rdquo; function <math>v : S \to \mathbb{R}</math> needs the data that is represented by this entire bigraph for <math>T\!</math> in order to compute the value <math>[t].\!</math>
which is true on the premisses of our universe of discourse.
 
  
The stock associations of `g`'o'h lead us to multiply out the
+
Finally, one observes that this component of <math>T\!</math> is a function in the direction <math>T : X \to Y,</math> since we are counting only teeth that occupy exactly one mouth of a tooth-bearing creature.
product m,,b,r along the following lines, where the trinomials
 
of the form (X:Y:Z)(Y:Z)(Z) are the only ones that produce any
 
non-null result, specifically, of the form (X:Y:Z)(Y:Z)(Z) = X.
 
  
m,,b,r  = (C:C:C +, I:I:I +, J:J:J +, O:O:O)(O:O)(D +, O)
+
===Commentary Note 11.17===
  
        = (O:O:O)(O:O)(O)
+
I think the reader is beginning to get an inkling of the crucial importance of the &ldquo;number of&rdquo; function in Peirce's way of looking at logic. Among other things it is one of the planks in the bridge from logic to the theories of probability, statistics, and information, in which setting logic forms but a limiting case at one scenic turnout on the expanding vista.  It is, as a matter of necessity and a matter of fact, practically speaking at any rate, one way that Peirce forges a link between the ''eternal'', logical, or rational realm and the ''secular'', empirical, or real domain.
  
        =  O
+
With that little bit of encouragement and exhortation, let us return to the nitty gritty details of the text.
  
So we have that m,,b,r = m,b,r.
+
'''NOF 2'''
  
In closing, observe that the teridentity relation has turned up again
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
in this context, as the second comma-ing of the universal term itself:
+
|
 +
<p>But not only do the significations of &nbsp;<math>=\!</math>&nbsp; and &nbsp;<math><\!</math>&nbsp; here adopted fulfill all absolute requirements, but they have the supererogatory virtue of being very nearly the same as the common significations.  Equality is, in fact, nothing but the identity of two numbers;  numbers that are equal are those which are predicable of the same collections, just as terms that are identical are those which are predicable of the same classes.  So, to write <math>5 < 7\!</math> is to say that <math>5\!</math> is part of <math>7\!</math>, just as to write <math>\mathrm{f} < \mathrm{m}~\!</math> is to say that Frenchmen are part of men.  Indeed, if <math>\mathrm{f} < \mathrm{m}~\!</math>, then the number of Frenchmen is less than the number of men, and if <math>\mathrm{v} = \mathrm{p}\!</math>, then the number of Vice-Presidents is equal to the number of Presidents of the Senate;  so that the numbers may always be substituted for the terms themselves, in case no signs of operation occur in the equations or inequalities.</p>
 +
 
 +
<p>(Peirce, CP 3.66).</p>
 +
|}
  
1,,  = B:B:B +, C:C:C +, D:D:D +, E:E:E +, I:I:I +, J:J:J +, O:O:O.
+
Peirce is here remarking on the principle that the measure <math>\mathit{v}\!</math> on terms ''preserves'' or ''respects'' the prevailing implication, inclusion, or subsumption relations that impose an ordering on those terms. In these initiatory passages of the text, Peirce is using a single symbol &nbsp;<math><\!</math>&nbsp; to denote the usual linear ordering on numbers, but also what amounts to the implication ordering on logical terms and the inclusion ordering on classes. Later, of course, he will introduce distinctive symbols for logical orders.  The links among terms, sets, and numbers can be pursued in all directions, and Peirce has already indicated in an earlier paper how he would construct the integers from sets, that is, from the aggregate denotations of terms.  I will try to get back to that another time.
  
 +
We have a statement of the following form:
  
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
| If <math>\mathrm{f} < \mathrm{m},\!</math> then the number of Frenchmen is less than the number of men.
 +
|}
  
LOR.  Note 11
+
This goes into symbolic form as follows:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{matrix}
 +
\mathrm{f} < \mathrm{m} & \Rightarrow & [\mathrm{f}] < [\mathrm{m}].
 +
\end{matrix}</math>
 +
|}
  
 +
In this setting the <math>^{\backprime\backprime}\!\!<\!^{\prime\prime}</math> on the left is a logical ordering on syntactic terms while the <math>^{\backprime\backprime}\!\!<\!^{\prime\prime}</math> on the right is an arithmetic ordering on real numbers.
  
| The Signs for Multiplication (concl.)
+
The question that arises in this case is whether a map between two ordered sets is ''order-preserving''. In order to formulate the question in more general terms, we may begin with the following set-up:
|
 
| The conception of multiplication we have adopted is that of
 
| the application of one relation to another.  So, a quaternion
 
| being the relation of one vector to another, the multiplication
 
| of quaternions is the application of one such relation to a second.
 
|
 
| Even ordinary numerical multiplication involves the same idea, for
 
| 2 x 3 is a pair of triplets, and 3 x 2 is a triplet of pairs, where
 
| "triplet of" and "pair of" are evidently relatives.
 
|
 
| If we have an equation of the form:
 
|
 
| xy  =  z
 
|
 
| and there are just as many x's per y as there are,
 
| 'per' things, things of the universe, then we have
 
| also the arithmetical equation:
 
|
 
| [x][y]  = [z].
 
|
 
| For instance, if our universe is perfect men, and there
 
| are as many teeth to a Frenchman (perfect understood)
 
| as there are to any one of the universe, then:
 
|
 
| ['t'][f]  =  ['t'f]
 
|
 
| holds arithmetically.
 
|
 
| So if men are just as apt to be black as things in general:
 
|
 
| [m,][b]  =  [m,b]
 
|
 
| where the difference between [m] and [m,] must not be overlooked.
 
|
 
| It is to be observed that:
 
|
 
| [!1!]  =  `1`.
 
|
 
| Boole was the first to show this connection between logic and
 
| probabilities.  He was restricted, however, to absolute terms.
 
| I do not remember having seen any extension of probability to
 
| relatives, except the ordinary theory of 'expectation'.
 
|
 
| Our logical multiplication, then, satisfies the essential conditions
 
| of multiplication, has a unity, has a conception similar to that of
 
| admitted multiplications, and contains numerical multiplication as
 
| a case under it.
 
|
 
| C.S. Peirce, CP 3.76
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| Let <math>X_1\!</math> be a set with the ordering <math><_1\!.</math>
 +
|-
 +
| Let <math>X_2\!</math> be a set with the ordering <math><_2\!.</math>
 +
|}
  
 +
An order relation is typically defined by a set of axioms that determines its properties.  Since we have frequent occasion to view the same set in the light of several different order relations, we often resort to explicit specifications like <math>(X, <_1),\!</math> <math>(X, <_2),\!</math> and so on, to indicate a set with a given ordering.
  
LOR.  Commentary Note 11.1
+
A map <math>F : (X_1, <_1) \to (X_2, <_2)</math> is ''order-preserving'' if and only if a statement of a particular form holds for all <math>x\!</math> and <math>y\!</math> in <math>(X_1, <_1),\!</math> namely, the following:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{matrix}
 +
x <_1 y & \Rightarrow & F(x) <_2 F(y).
 +
\end{matrix}</math>
 +
|}
  
 +
The &ldquo;number of&rdquo; map <math>v : (S, <_1) \to (\mathbb{R}, <_2)</math> has just this character, as exemplified in the case at hand:
  
We have reached in our reading of Peirce's text a suitable place to pause --
+
{| align="center" cellspacing="6" width="90%"
actually, it is more like to run as fast as we can along a parallel track --
+
|
where I can due quietus make of a few IOU's that I've used to pave my way.
+
<math>\begin{matrix}
 +
\mathrm{f} & < & \mathrm{m} & \Rightarrow & [\mathrm{f}]  & < & [\mathrm{m}]
 +
\\[6pt]
 +
\mathrm{f} & < & \mathrm{m} & \Rightarrow & v(\mathrm{f}) & < & v(\mathrm{m})
 +
\end{matrix}</math>
 +
|}
  
The more pressing debts that come to mind are concerned with the matter
+
Here, the <math>^{\backprime\backprime}\!\!<\!^{\prime\prime}</math> on the left is read as ''proper inclusion'', in other words, ''subset of but not equal to'', while the <math>^{\backprime\backprime}\!\!<\!^{\prime\prime}</math> on the right is read as the ordinary ''less than'' relation.
of Peirce's "number of" function, that maps a term t into a number [t],
 
and with my justification for calling a certain style of illustration
 
by the name of the "hypergraph" picture of relational composition.
 
As it happens, there is a thematic relation between these topics,
 
and so I can make my way forward by addressing them together.
 
  
At this point we have two good pictures of how to compute the
+
===Commentary Note 11.18===
relational compositions of arbitrary 2-adic relations, namely,
 
the bigraph and the matrix representations, each of which has
 
its differential advantages in different types of situations.
 
  
But we do not have a comparable picture of how to compute the
+
An ''order-preserving map'' is a special case of a ''structure preserving map'', and the idea of ''preserving structure'', as used in mathematics, always means preserving ''some'' but not necessarily ''all'' the structure of the source domain in questionPeople sometimes express this by speaking of ''structure preservation in measure'', the implication being that any property that is amenable to being qualified in manner is potentially amenable to being quantified in degree, perhaps in such a way as to answer questions like &ldquo;How structure-preserving is it?&rdquo;
richer variety of relational compositions that involve 3-adic
 
or any higher adicity relationsAs a matter of fact, we run
 
into a non-trivial classification problem simply to enumerate
 
the different types of compositions that arise in these cases.
 
  
Therefore, let us inaugurate a systematic study of relational composition,
+
Let's see how this remark applies to the order-preserving property of the &ldquo;number of&rdquo; mapping <math>v : S \to \mathbb{R}.</math>  For any pair of absolute terms <math>x\!</math> and <math>y\!</math> in the syntactic domain <math>S,\!</math> we have the following implications, where <math>^{\backprime\backprime}-\!\!\!<\!^{\prime\prime}</math> denotes the logical subsumption relation on terms and <math>^{\backprime\backprime}\!\!\le\!^{\prime\prime}</math> denotes the ''less than or equal to'' relation on the real number domain <math>\mathbb{R}.</math>
general enough to explicate the "generative potency" of Peirce's 1870 LOR.
 
  
 +
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
x ~-\!\!\!< y & \Rightarrow & vx \le vy
 +
\end{array}</math>
 +
|}
  
 +
Equivalently:
  
LOR.  Commentary Note 11.2
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>\begin{array}{lll}
 +
x ~-\!\!\!< y & \Rightarrow & [x] \le [y]
 +
\end{array}</math>
 +
|}
  
 +
Nowhere near the number of logical distinctions that exist on the left hand side of the implication arrow can be preserved as one passes to the linear ordering of real numbers on the right hand side of the implication arrow, but that is not required in order to call the map <math>v : S \to \mathbb{R}</math> ''order-preserving'', or what is known as an ''order morphism''.
  
 +
===Commentary Note 11.19===
  
Let's bring together the various things that Peirce has said
+
Up to this point in the 1870 Logic of Relatives, Peirce has introduced the &ldquo;number of&rdquo; function on logical terms and discussed the extent to which its use as a measure, <math>v : S \to \mathbb{R}\!</math> such that <math>v : s \mapsto [s],\!</math> satisfies the relevant measure-theoretic principles, for starters, these two:
about the "number of function" up to this point in the paper.
 
  
NOF 1.
+
{| align="center" cellspacing="6" width="90%"
 +
| valign="top" | 1.
 +
| The &ldquo;number of&rdquo; map exhibits a certain type of ''uniformity property'', whereby the value of the measure on a uniformly qualified population is in fact actualized by each member of the population.
 +
|-
 +
| valign="top" | 2.
 +
| The &ldquo;number of&rdquo; map satisfies an ''order morphism principle'', whereby the illative partial ordering of logical terms is reflected up to a partial extent by the arithmetical linear ordering of their measures.
 +
|}
  
| I propose to assign to all logical terms, numbers;
+
Peirce next takes up the action of the &ldquo;number of&rdquo; map on the two types of, loosely speaking, ''additive'' operations that we normally consider in logic.
| to an absolute term, the number of individuals it denotes;
+
 
| to a relative term, the average number of things so related
+
'''NOF 3.1'''
| to one individual.
+
 
|
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
| Thus in a universe of perfect men ('men'),
 
| the number of "tooth of" would be 32.
 
 
|
 
|
| The number of a relative with two correlates would be the
+
<p>It is plain that both the regular non-invertible addition and the invertible addition satisfy the absolute conditions.</p>
| average number of things so related to a pair of individuals;
+
 
| and so on for relatives of higher numbers of correlates.
+
<p>(Peirce, CP 3.67).</p>
 +
|}
 +
 
 +
The sign <math>^{\backprime\backprime} +\!\!, {}^{\prime\prime}</math> denotes what Peirce calls &ldquo;the regular non-invertible addition&rdquo;, corresponding to the inclusive disjunction of logical terms or the union of their extensions as sets.
 +
 
 +
The sign <math>^{\backprime\backprime} + ^{\prime\prime}</math> denotes what Peirce calls &ldquo;the invertible addition&rdquo;, corresponding to the exclusive disjunction of logical terms or the symmetric difference of their extensions as sets.
 +
 
 +
'''NOF 3.2'''
 +
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| I propose to denote the number of a logical term by
+
<p>But the notation has other recommendations.  The conception of ''taking together'' involved in these processes is strongly analogous to that of summation, the sum of <math>2\!</math> and <math>5,\!</math> for example, being the number of a collection which consists of a collection of two and a collection of five.</p>
| enclosing the term in square brackets, thus ['t'].
+
 
 +
<p>(Peirce, CP 3.67).</p>
 +
|}
 +
 
 +
A full interpretation of this remark will require us to pick up the precise technical sense in which Peirce is using the word ''collection'', and that will take us back to his logical reconstruction of certain aspects of number theory, all of which I am putting off to another time, but it is still possible to get a rough sense of what he's saying relative to the present frame of discussion.
 +
 
 +
The &ldquo;number of&rdquo; map <math>v : S \to \mathbb{R}</math> evidently induces some sort of morphism with respect to logical sums. If this were straightforwardly true, we could write:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| C.S. Peirce, CP 3.65
+
<math>\begin{matrix}
 +
? & v(x ~+\!\!,~ y) & = & v(x) ~+~ v(y) & ?
 +
\end{matrix}</math>
 +
|}
  
NOF 2.
+
Equivalently:
  
| But not only do the significations of '=' and '<' here adopted fulfill all
+
{| align="center" cellspacing="6" width="90%"
| absolute requirements, but they have the supererogatory virtue of being very
 
| nearly the same as the common significations.  Equality is, in fact, nothing
 
| but the identity of two numbers;  numbers that are equal are those which are
 
| predicable of the same collections, just as terms that are identical are those
 
| which are predicable of the same classes.  So, to write 5 < 7 is to say that 5
 
| is part of 7, just as to write f < m is to say that Frenchmen are part of men.
 
| Indeed, if f < m, then the number of Frenchmen is less than the number of men,
 
| and if v = p, then the number of Vice-Presidents is equal to the number of
 
| Presidents of the Senate;  so that the numbers may always be substituted
 
| for the terms themselves, in case no signs of operation occur in the
 
| equations or inequalities.
 
 
|
 
|
| C.S. Peirce, CP 3.66
+
<math>\begin{matrix}
 +
? & [x ~+\!\!,~ y] & = & [x] ~+~ [y] & ?
 +
\end{matrix}</math>
 +
|}
  
NOF 3.
+
Of course, things are not quite that simple when it comes to inclusive disjunctions and set-theoretic unions, so it is usual to introduce the concept of a ''sub-additive measure'' to describe the principle that does hold here, namely, the following:
  
| It is plain that both the regular non-invertible addition
+
{| align="center" cellspacing="6" width="90%"
| and the invertible addition satisfy the absolute conditions.
 
| But the notation has other recommendations.  The conception
 
| of 'taking together' involved in these processes is strongly
 
| analogous to that of summation, the sum of 2 and 5, for example,
 
| being the number of a collection which consists of a collection of
 
| two and a collection of five.  Any logical equation or inequality
 
| in which no operation but addition is involved may be converted
 
| into a numerical equation or inequality by substituting the
 
| numbers of the several terms for the terms themselves --
 
| provided all the terms summed are mutually exclusive.
 
 
|
 
|
| Addition being taken in this sense,
+
<math>\begin{matrix}
| 'nothing' is to be denoted by 'zero',
+
v(x ~+\!\!,~ y) & \le & v(x) ~+~ v(y)
| for then:
+
\end{matrix}</math>
 +
|}
 +
 
 +
Equivalently:
 +
 
 +
{| align="center" cellspacing="6" width="90%"
 
|
 
|
| x +, = x
+
<math>\begin{matrix}
 +
[x ~+\!\!,~ y] & \le & [x] ~+~ [y]
 +
\end{matrix}</math>
 +
|}
 +
 
 +
This is why Peirce trims his discussion of this point with the following hedge:
 +
 
 +
'''NOF 3.3'''
 +
 
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
|
 
|
| whatever is denoted by x;  and this is the definition
+
<p>Any logical equation or inequality in which no operation but addition is involved may be converted into a numerical equation or inequality by substituting the numbers of the several terms for the terms themselves &mdash; provided all the terms summed are mutually exclusive.</p>
| of 'zero'.  This interpretation is given by Boole, and
+
 
| is very neat, on account of the resemblance between the
+
<p>(Peirce, CP 3.67).</p>
| ordinary conception of 'zero' and that of nothing, and
+
|}
| because we shall thus have
+
 
|
+
Finally, a morphism with respect to addition, even a contingently qualified one, must do the right stuff on behalf of the additive identity:
| [0]  =  0.
 
|
 
| C.S. Peirce, CP 3.67
 
  
NOF 4.
+
'''NOF 3.4'''
  
| The conception of multiplication we have adopted is
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
| that of the application of one relation to another.  ...
 
 
|
 
|
| Even ordinary numerical multiplication involves the same idea,
+
<p>Addition being taken in this sense, ''nothing'' is to be denoted by ''zero'', for then</p>
| for 2 x 3 is a pair of triplets, and 3 x 2 is a triplet of pairs,
+
|-
| where "triplet of" and "pair of" are evidently relatives.
+
| align="center" | <math>x ~+\!\!,~ 0 ~=~ x</math>
 +
|-
 
|
 
|
| If we have an equation of the form:
+
<p>whatever is denoted by <math>x\!</math>;  and this is the definition of ''zero''.  This interpretation is given by Boole, and is very neat, on account of the resemblance between the ordinary conception of ''zero'' and that of nothing, and because we shall thus have</p>
 +
|-
 +
| align="center" | <math>[0] ~=~ 0.</math>
 +
|-
 
|
 
|
| xy  =  z
+
<p>(Peirce, CP 3.67).</p>
|
+
|}
| and there are just as many x's per y as there are,
+
 
| 'per' things, things of the universe, then we have
+
With respect to the nullity <math>0\!</math> in <math>S\!</math> and the number <math>0\!</math> in <math>\mathbb{R},</math> we have:
| also the arithmetical equation:
+
 
|
+
{| align="center" cellspacing="6" width="90%"
| [x][y]  = [z].
+
| <math>v0 ~=~ [0] ~=~ 0.</math>
|
+
|}
| For instance, if our universe is perfect men, and there
 
| are as many teeth to a Frenchman (perfect understood)
 
| as there are to any one of the universe, then:
 
|
 
| ['t'][f]  = ['t'f]
 
|
 
| holds arithmetically.
 
|
 
| So if men are just as apt to be black as things in general:
 
|
 
| [m,][b]  = [m,b]
 
|
 
| where the difference between [m] and [m,] must not be overlooked.
 
|
 
| It is to be observed that:
 
|
 
| [!1!] = `1`.
 
|
 
| Boole was the first to show this connection between logic and
 
| probabilities.  He was restricted, however, to absolute terms.
 
| I do not remember having seen any extension of probability to
 
| relatives, except the ordinary theory of 'expectation'.
 
|
 
| Our logical multiplication, then, satisfies the essential conditions
 
| of multiplication, has a unity, has a conception similar to that of
 
| admitted multiplications, and contains numerical multiplication as
 
| a case under it.
 
|
 
| C.S. Peirce, CP 3.76
 
  
Before I can discuss Peirce's "number of" function in greater detail
+
In sum, therefore, it can be said: &nbsp; ''It also serves that only preserves a due respect for the function of a vacuum in nature.''
I will need to deal with an expositional difficulty that I have been
 
very carefully dancing around all this time, but that will no longer
 
abide its assigned place under the rug.
 
  
Functions have long been understood, from well before Peirce's time to ours,
+
===Commentary Note 11.20===
as special cases of 2-adic relations, so the "number of" function itself is
 
already to be numbered among the types of 2-adic relatives that we've been
 
explictly mentioning and implicitly using all this time.  But Peirce's way
 
of talking about a 2-adic relative term is to list the "relate" first and
 
the "correlate" second, a convention that goes over into functional terms
 
as making the functional value first and the functional antecedent second,
 
whereas almost anyone brought up in our present time frame has difficulty
 
thinking of a function any other way than as a set of ordered pairs where
 
the order in each pair lists the functional argument, or domain element,
 
first and the functional value, or codomain element, second.
 
  
It is possible to work all this out in a very nice way within a very general context
+
We arrive at the last of Peirce's statements about the &ldquo;number of&rdquo; map that we singled out above:
of flexible conventions, but not without introducing an order of anachronisms into
 
Peirce's presentation that I am presently trying to avoid as much as possible.
 
Thus, I will need to experiment with various sorts of compromise formations.
 
  
 +
'''NOF 4.1'''
  
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>The conception of multiplication we have adopted is that of the application of one relation to another.  &hellip;</p>
  
LOR.  Commentary Note 11.3
+
<p>Even ordinary numerical multiplication involves the same idea, for <math>~2 \times 3~</math> is a pair of triplets, and <math>~3 \times 2~</math> is a triplet of pairs, where &ldquo;triplet of&rdquo; and &ldquo;pair of&rdquo; are evidently relatives.</p>
  
 +
<p>If we have an equation of the form:</p>
 +
|-
 +
| align="center" | <math>xy ~=~ z</math>
 +
|-
 +
|
 +
<p>and there are just as many <math>x\!</math>'s per <math>y\!</math> as there are ''per'' things, things of the universe, then we have also the arithmetical equation:</p>
 +
|-
 +
| align="center" | <math>[x][y] ~=~ [z].</math>
 +
|-
 +
|
 +
<p>(Peirce, CP 3.76).</p>
 +
|}
  
 +
Peirce is here observing what we might call a ''contingent morphism''.  Provided that a certain condition, to be named in short order, happens to be satisfied, we would find it holding that the &ldquo;number of&rdquo; map <math>v : S \to \mathbb{R}</math> such that <math>v(s) = [s]\!</math> serves to preserve the multiplication of relative terms, that is to say, the composition of relations, in the form:  <math>[xy] = [x][y].\!</math>  So let us try to uncross Peirce's manifestly chiasmatic encryption of the condition that is called on in support of this preservation.
  
Having spent a fair amount of time in earnest reflection on the issue,
+
The proviso for the equation <math>[xy] = [x][y]\!</math> to hold is this:
I cannot see a way to continue my interpretation of Peirce's 1870 LOR,
 
to master the distance between his conventions of presentation and my
 
present personal perspectives on relations, without introducing a few
 
interpretive anachronisms and other artifacts in the process, and the
 
only excuse that I can make for myself is that at least these will be
 
novel sorts of anachronisms and artifacts in comparison with the ones
 
that the reeder may alreedy have seen.  A poor excuse, but all I have.
 
The least that I can do, then, and I'm something of an expert on that,
 
is to exposit my personal interpretive apparatus on a separate thread,
 
where it will not distract too much from the intellectual canon, that
 
is to opine, the "thinking panpipe" that we find in Peirce's 1870 LOR.
 
  
Ripped from the pages of my dissertation, then, I will lay out
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
some samples of background material on "Relations In General",
+
|
as spied from a combinatorial point of view, that I hope will
+
<p>There are just as many <math>x\!</math>'s per <math>y\!</math> as there are ''per'' things, things of the universe.</p>
serve in reeding Peirce's text, if we draw on it judiciously.
 
  
 +
<p>(Peirce, CP 3.76).</p>
 +
|}
  
 +
Returning to the example that Peirce gives:
  
LOR. Commentary Note 11.4
+
'''NOF 4.2'''
  
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>For instance, if our universe is perfect men, and there are as many teeth to a Frenchman (perfect understood) as there are to any one of the universe, then:</p>
 +
|-
 +
| align="center" | <math>[\mathit{t}][\mathrm{f}] ~=~ [\mathit{t}\mathrm{f}]</math>
 +
|-
 +
|
 +
<p>holds arithmetically.</p>
  
 +
<p>(Peirce, CP 3.76).</p>
 +
|}
  
The task before us now is to get very clear about the relationships
+
Now that is something that we can sink our teeth into and trace the bigraph representation of the situation.  It will help to recall our first examination of the &ldquo;tooth&nbsp;of&rdquo; relation and to adjust the picture we sketched of it on that occasion.
among relative terms, relations, and the special cases of relations
 
that are constituted by equivalence relations, functions, and so on.
 
  
I am optimistic that the some of the tethering material that I spun
+
Transcribing Peirce's example:
along the "Relations In General" (RIG) thread will help us to track
 
the equivalential and functional properties of special relations in
 
a way that will not weigh too heavy on the rather capricious lineal
 
embedding of syntax in 1-dimensional strings on 2-dimensional pages.
 
But I cannot see far enough ahead to forsee all the consequences of
 
trying this tack, and so I cannot help but to be a bit experimental.
 
  
The first obstacle to get past is the order convention
+
{| width="100%"
that Peirce's orientation to relative terms causes him
+
| width="10%" | Let
to use for functions.  By way of making our discussion
+
| <math>\mathrm{m} = \text{man}\!</math>
concrete, and directing our attentions to an immediate
+
| width="10%" | &nbsp;
object example, let us say that we desire to represent
+
|-
the "number of" function, that Peirce denotes by means
+
| &nbsp;
of square brackets, by means of a 2-adic relative term,
+
|-
say 'v', where 'v'(t) = [t] = the number of the term t.
+
| and
 +
| <math>\mathit{t} = \text{tooth of}\,\underline{~~ ~~}.\!</math>
 +
| &nbsp;
 +
|-
 +
| &nbsp;
 +
|-
 +
| Then
 +
| <math>v(\mathit{t}) ~=~ [\mathit{t}] ~=~ \frac{[\mathit{t}\mathrm{m}]}{[\mathrm{m}]}.\!</math>
 +
| &nbsp;
 +
|}
  
To set the 2-adic relative term 'v' within a suitable context of interpretation,
+
That is to say, the number of the relative term <math>\text{tooth of}\,\underline{~~ ~~}\!</math> is equal to the number of teeth of humans divided by the number of humansIn a universe of perfect human dentition this gives a quotient of <math>32.\!</math>
let us suppose that 'v' corresponds to a relation V c R x S, where R is the set
 
of real numbers and S is a suitable syntactic domain, here described as "terms".
 
Then the 2-adic relation V is evidently a function from S to RWe might think
 
to use the plain letter "v" to denote this function, as v : S -> R, but I worry
 
this may be a chaos waiting to happen.  Also, I think that we should anticipate
 
the very great likelihood that we cannot always assign numbers to every term in
 
whatever syntactic domain S that we choose, so it is probably better to account
 
the 2-adic relation V as a partial function from S to R.  All things considered,
 
then, let me try out the following impedimentaria of strategies and compromises.
 
  
First, I will adapt the functional arrow notation so that it allows us
+
The dyadic relative term <math>t\!</math> determines a dyadic relation <math>T \subseteq X \times Y,</math> where <math>X\!</math> contains all the teeth and <math>Y\!</math> contains all the people that happen to be under discussion.
to detach the functional orientation from the order in which the names
 
of domains are written on the page. Second, I will need to change the
 
notation for "pre-functions", or "partial functions", from one likely
 
confound to a slightly less likely confound.  This gives the scheme:
 
  
  q : X -> Y means that q is functional at X.
+
To make the case as simple as possible and still cover the point, suppose there are just four people in our universe of discourse and just two of them are French.  The bigraphical composition below shows the pertinent facts of the case.
  
  q : X <- Y means that q is functional at Y.
+
{| align="center" cellpadding="10"
 +
| [[Image:LOR 1870 Figure 52.jpg]] || (52)
 +
|}
  
  q : X ~> Y means that q is pre-functional at X.
+
In this picture the order of relational composition flows down the page.  For convenience in composing relations, the absolute term <math>\mathrm{f} = \text{Frenchman}\!</math> is inflected by the comma functor to form the dyadic relative term <math>\mathrm{f,} = \text{Frenchman that is}\,\underline{~~ ~~},\!</math> which in turn determines the idempotent representation of Frenchmen as a subset of mankind, <math>F \subseteq Y \times Y.\!</math>
  
  q : X <~ Y means that q is pre-functional at Y.
+
By way of a legend for the figure, we have the following data:
  
For now, I will pretend that v is a function in R of S, v : R <- S,
+
{| align="center" cellspacing="6" width="90%"
amounting to the functional alias of the 2-adic relation V c R x S,
+
|
and associated with the 2-adic relative term 'v' whose relate lies
+
<math>\begin{array}{lllr}
in the set R of real numbers and whose correlate lies in the set S
+
\mathrm{m}
of syntactic terms.
+
& = &
 +
\mathrm{J} ~+\!\!,~ \mathrm{K} ~+\!\!,~ \mathrm{L} ~+\!\!,~ \mathrm{M} \qquad = &
 +
\mathbf{1}
 +
\\[6pt]
 +
\mathrm{f}
 +
& = & \mathrm{K} ~+\!\!,~ \mathrm{M}
 +
\\[6pt]
 +
\mathrm{f,}
 +
& = & \mathrm{K}\!:\!\mathrm{K} ~+\!\!,~ \mathrm{M}\!:\!\mathrm{M}
 +
\\[6pt]
 +
\mathit{t}
 +
& = & (T_{001} ~+\!\!,~ \dots ~+\!\!,~ T_{032}):J & ~+\!\!,
 +
\\[6pt]
 +
&  & (T_{033} ~+\!\!,~ \dots ~+\!\!,~ T_{064}):K & ~+\!\!,
 +
\\[6pt]
 +
&  & (T_{065} ~+\!\!,~ \dots ~+\!\!,~ T_{096}):L & ~+\!\!,
 +
\\[6pt]
 +
&  & (T_{097} ~+\!\!,~ \dots ~+\!\!,~ T_{128}):M
 +
\end{array}</math>
 +
|}
  
 +
Now let's see if we can use this picture to make sense of the following statement:
  
 +
'''NOF 4.3'''
  
LOR. Commentary Note 11.5
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>For instance, if our universe is perfect men, and there are as many teeth to a Frenchman (perfect understood) as there are to any one of the universe, then:</p>
 +
|-
 +
| align="center" | <math>[\mathit{t}][\mathrm{f}] ~=~ [\mathit{t}\mathrm{f}]</math>
 +
|-
 +
|
 +
<p>holds arithmetically.</p>
  
 +
<p>(Peirce, CP 3.76).</p>
 +
|}
  
 +
In statistical terms, Peirce is saying this:  If the population of Frenchmen is a ''fair sample'' of the general population with regard to the factor of dentition, then the morphic equation,
  
It always helps me to draw lots of pictures of stuff,
+
{| align="center" cellspacing="6" width="90%"
so let's extract the somewhat overly compressed bits
+
| <math>[\mathit{t}\mathrm{f}] = [\mathit{t}][\mathrm{f}],\!</math>
of the "Relations In General" thread that we'll need
+
|}
right away for the applications to Peirce's 1870 LOR,
 
and draw what icons we can within the frame of Ascii.
 
  
For the immediate present, we may start with 2-adic relations
+
whose transpose gives the equation,
and describe the customary species of relations and functions
 
in terms of their local and numerical incidence properties.
 
  
Let P c X x Y be an arbitrary 2-adic relation.
+
{| align="center" cellspacing="6" width="90%"
The following properties of P can be defined:
+
| <math>[\mathit{t}] = \frac{[\mathit{t}\mathrm{f}]}{[\mathrm{f}]},\!</math>
 +
|}
  
P is "total" at X    iff  P is (>=1)-regular at X.
+
is every bit as true as the defining equation in this circumstance, namely,
  
P is "total" at Y    iff  P is (>=1)-regular at Y.
+
{| align="center" cellspacing="6" width="90%"
 +
| <math>[\mathit{t}] = \frac{[\mathit{t}\mathrm{m}]}{[\mathrm{m}]}.\!</math>
 +
|}
  
P is "tubular" at X  iff  P is (=<1)-regular at X.
+
===Commentary Note 11.21===
  
P is "tubular" at Y  iff  P is (=<1)-regular at Y.
+
One more example and one more general observation, and then we will be all caught up with our homework on Peirce's &ldquo;number of&rdquo; function.
  
To illustrate these properties, let us fashion
+
'''NOF 4.4'''
a "generic enough" example of a 2-adic relation,
 
E c X x Y, where X = Y = {0, 1, ..., 8, 9}, and
 
where the bigraph picture of E looks like this:
 
  
0  1  2  3  4  5  6   7  8  9
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
o  o  o  o  o  o  o  o  o  o  X
+
|
    \  |\ /|\  \  \  |   |\
+
<p>So if men are just as apt to be black as things in general,</p>
      \ | / | \   \   \ |   | \         E
+
|-
      \|/ \\   \  \|  |  \
+
| align="center" | <math>[\mathrm{m,}][\mathrm{b}] ~=~ [\mathrm{m,}\mathrm{b}],\!</math>
o  o  o  o  o  o  o  o  o  o  Y
+
|-
0  1  2  3  4  5  6  7  8  9
+
|
 +
<p>where the difference between <math>[\mathrm{m}]\!</math> and <math>[\mathrm{m,}]\!</math> must not be overlooked.</p>
  
If we scan along the X dimension we see that the "Y incidence degrees"
+
<p>(Peirce, CP 3.76).</p>
of the X nodes 0 through 9 are 0, 1, 2, 3, 1, 1, 1, 2, 0, 0, in order.
+
|}
  
If we scan along the Y dimension we see that the "X incidence degrees"
+
The protasis, &ldquo;men are just as apt to be black as things in general&rdquo;, is elliptic in structure, and presents us with a potential ambiguity.  If we had no further clue to its meaning, it might be read as either of the following:
of the Y nodes 0 through 9 are 0, 0, 3, 2, 1, 1, 2, 1, 1, 0, in order.
 
  
Thus, E is not total at either X or Y,
+
{| align="center" cellspacing="6" width="90%"
since there are nodes in both X and Y
+
| valign="top" | 1.
having incidence degrees that equal 0.
+
| Men are just as apt to be black as things in general are apt to be black.
 +
|-
 +
| valign="top" | 2.
 +
| Men are just as apt to be black as men are apt to be things in general.
 +
|}
  
Also, E is not tubular at either X or Y,
+
The second interpretation, if grammatical, is pointless to state, since it equates a proper contingency with an absolute certainty. So I think it is safe to assume this paraphrase of what Peirce intends:
since there exist nodes in both X and Y
 
having incidence degrees greater than 1.
 
  
Clearly, then, E cannot qualify as a pre-function
+
{| align="center" cellspacing="6" width="90%"
or a function on either of its relational domains.
+
| <p>Men are just as likely to be black as things in general are likely to be black.</p>
 +
|}
  
 +
Stated in terms of the conditional probability:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| <math>\mathrm{P}(\mathrm{b}|\mathrm{m}) ~=~ \mathrm{P}(\mathrm{b}).\!</math>
 +
|}
  
LOR.  Commentary Note 11.6
+
From the definition of conditional probability:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| <math>\mathrm{P}(\mathrm{b}|\mathrm{m}) ~=~ {\mathrm{P}(\mathrm{b}\mathrm{m}) \over \mathrm{P}(\mathrm{m})}.\!</math>
 +
|}
  
 +
Equivalently:
  
Let's continue to work our way through the rest of the first
+
{| align="center" cellspacing="6" width="90%"
set of definitions, making up appropriate examples as we go.
+
| <math>\mathrm{P}(\mathrm{b}\mathrm{m}) ~=~ \mathrm{P}(\mathrm{b}|\mathrm{m})\mathrm{P}(\mathrm{m}).\!</math>
 +
|}
  
| Let P c X x Y be an arbitrary 2-adic relation.
+
Taking everything together, we obtain the following result:
| The following properties of P can be defined:
 
|
 
| P is "total" at X    iff  P is (>=1)-regular at X.
 
|
 
| P is "total" at Y    iff  P is (>=1)-regular at Y.
 
|
 
| P is "tubular" at X  iff  P is (=<1)-regular at X.
 
|
 
| P is "tubular" at Y  iff  P is (=<1)-regular at Y.
 
  
E_1 exemplifies the quality of "totality at X".
+
{| align="center" cellspacing="6" width="90%"
 +
| <math>\mathrm{P}(\mathrm{b}\mathrm{m}) ~=~ \mathrm{P}(\mathrm{b}|\mathrm{m})\mathrm{P}(\mathrm{m}) ~=~ \mathrm{P}(\mathrm{b})\mathrm{P}(\mathrm{m}).\!</math>
 +
|}
  
0  1  2  3  4  5  6  7  8  9
+
This, of course, is the definition of independent events, as applied to the event of being Black and the event of being a Man. It seems to be the most likely guess that this is the meaning of Peirce's statement about frequencies:
o  o  o  o  o  o  o  o  o  o  X
 
  \  \  |\ /|\  \  \  |  |\  \  |
 
  \  \ | / | \  \  \ |  | \  \ |  E_1
 
  \  \|/ \|  \  \  \|  |  \  \|
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
E_2 exemplifies the quality of "totality at Y".
+
{| align="center" cellspacing="6" width="90%"
 +
| <math>[\mathrm{m,}\mathrm{b}] ~=~ [\mathrm{m,}][\mathrm{b}].\!</math>
 +
|}
  
0  1  2  3  4  5  6  7  8  9
+
The terms of this equation can be normalized to produce the corresponding statement about probabilities:
o  o  o  o  o  o  o  o  o  o  X
 
|\  \  |\ /|\  \  \  |  |\  \
 
| \  \ | / | \  \  \ |  | \  \    E_2
 
|  \  \|/ \|  \  \  \|  |  \  \
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
E_3 exemplifies the quality of "tubularity at X".
+
{| align="center" cellspacing="6" width="90%"
 +
| <math>\mathrm{P}(\mathrm{m}\mathrm{b}) ~=~ \mathrm{P}(\mathrm{m})\mathrm{P}(\mathrm{b}).\!</math>
 +
|}
  
0  1  2  3  4  5  6  7  8  9
+
Let's see if this checks out.
o  o  o  o  o  o  o  o  o  o  X
 
    \  |  /    \  \  |  |
 
      \ | /      \  \ |  |          E_3
 
      \|/        \  \|  |
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
 
 
E_4 exemplifies the quality of "tubularity at Y".
 
  
0  1  2  3  4  5  6  7  8  9
+
Let <math>N\!</math> be the number of things in general.  In terms of Peirce's &ldquo;number of&rdquo; function, then, we have the equation <math>[\mathbf{1}] = N.</math> On the assumption that <math>\mathrm{m}\!</math> and <math>\mathrm{b}\!</math> are associated with independent events, we obtain the following sequence of equations:
o  o  o  o  o  o  o  o  o  o  X
 
          /|\  \  \      |\
 
          / | \   \  \    | \        E_4
 
        \   \   \   |  \
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
| If P c X x Y is tubular at X, then P is known as a "partial function"
+
{| align="center" cellspacing="6" width="90%"
| or a "pre-function" from X to Y, frequently signalized by renaming P
 
| with an alternative lower case name, say "p", and writing p : X ~> Y.
 
|
 
| Just by way of formalizing the definition:
 
|
 
| P is a "pre-function" P : X ~> Y  iff  P is tubular at X.
 
 
|
 
|
| P is a "pre-function" P : X <~ Y  iff  P is tubular at Y.
+
<math>\begin{array}{lll}
 +
[\mathrm{m,}\mathrm{b}]
 +
& = &
 +
\mathrm{P}(\mathrm{m}\mathrm{b}) N
 +
\\[6pt]
 +
& = &
 +
\mathrm{P}(\mathrm{m})\mathrm{P}(\mathrm{b}) N
 +
\\[6pt]
 +
& = &
 +
\mathrm{P}(\mathrm{m})[\mathrm{b}]
 +
\\[6pt]
 +
& = &
 +
[\mathrm{m,}][\mathrm{b}].
 +
\end{array}</math>
 +
|}
  
So, E_3 is a pre-function e_3 : X ~> Y,
+
As a result, we have to interpret <math>[\mathrm{m,}]\!</math> = &ldquo;the average number of men per things in general&rdquo; as <math>\mathrm{P}(\mathrm{m})\!</math> = &ldquo;the probability of a thing in general being a man&rdquo;.  This seems to make sense.
and E_4 is a pre-function e_4 : X <~ Y.
 
  
 +
===Commentary Note 11.22===
  
 +
Let's look at that last example from a different angle.
  
LOR. Commentary Note 11.7
+
'''NOF 4.4'''
  
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>So if men are just as apt to be black as things in general,</p>
 +
|-
 +
| align="center" | <math>[\mathrm{m,}][\mathrm{b}] ~=~ [\mathrm{m,}\mathrm{b}],\!</math>
 +
|-
 +
|
 +
<p>where the difference between <math>[\mathrm{m}]\!</math> and <math>[\mathrm{m,}]\!</math> must not be overlooked.</p>
  
 +
<p>(Peirce, CP 3.76).</p>
 +
|}
  
We come now to the very special cases of 2-adic relations that are
+
In different lights the formula <math>[\mathrm{m,}\mathrm{b}] = [\mathrm{m,}][\mathrm{b}]\!</math> presents itself as an ''aimed arrow'', ''fair sample'', or ''stochastic independence'' condition.
known as functions.  It will serve a dual purpose on behalf of the
 
exposition if we take the class of functions as a source of object
 
examples to clarify the more abstruse concepts in the RIG material.
 
  
To begin, let's recall the definition of a local flag:
+
The example apparently assumes a universe of ''things in general'', encompassing among other things the denotations of the absolute terms <math>\mathrm{m} = \text{man}\!</math> and <math>\mathrm{b} = \text{black}.\!</math>  That suggests to me that we might well illustrate this case in relief, by returning to our earlier staging of ''Othello'' and seeing how well that universe of dramatic discourse observes the premiss that &ldquo;men are just as apt to be black as things in general&rdquo;.
  
L_x@j  =  {<x_1, ..., x_j, ..., x_k> in L : x_j = x}.
+
Here are the relevant data:
  
In the case of a 2-adic relation L c X_1 x X_2 = X x Y,
+
{| align="center" cellspacing="6" width="90%"
we can reap the benefits of a radical simplification in
+
|
the definitions of the local flags.  Also in this case,
+
<math>\begin{array}{*{15}{l}}
we tend to denote L_u@1 by "L_u@X" and L_v@2 by "L_v@Y".
+
\mathrm{b} & = & \mathrm{O}
 +
\\[6pt]
 +
\mathrm{m} & = &
 +
\mathrm{C} & +\!\!, &
 +
\mathrm{I} & +\!\!, &
 +
\mathrm{J} & +\!\!, &
 +
\mathrm{O}
 +
\\[6pt]
 +
\mathbf{1} & = &
 +
\mathrm{B} & +\!\!, &
 +
\mathrm{C} & +\!\!, &
 +
\mathrm{D} & +\!\!, &
 +
\mathrm{E} & +\!\!, &
 +
\mathrm{I} & +\!\!, &
 +
\mathrm{J} & +\!\!, &
 +
\mathrm{O}
 +
\\[12pt]
 +
\mathrm{b,} & = & \mathrm{O\!:\!O}
 +
\\[6pt]
 +
\mathrm{m,} & = &
 +
\mathrm{C\!:\!C} & +\!\!, &
 +
\mathrm{I\!:\!I} & +\!\!, &
 +
\mathrm{J\!:\!J} & +\!\!, &
 +
\mathrm{O\!:\!O}
 +
\\[6pt]
 +
\mathbf{1,} & = &
 +
\mathrm{B\!:\!B} & +\!\!, &
 +
\mathrm{C\!:\!C} & +\!\!, &
 +
\mathrm{D\!:\!D} & +\!\!, &
 +
\mathrm{E\!:\!E} & +\!\!, &
 +
\mathrm{I\!:\!I} & +\!\!, &
 +
\mathrm{J\!:\!J} & +\!\!, &
 +
\mathrm{O\!:\!O}
 +
\end{array}</math>
 +
|}
  
In the light of these considerations, the local flags of
+
The ''fair sampling'' condition is tantamount to this:  &ldquo;Men are just as apt to be black as things in general are apt to be black&rdquo;.  In other words, men are a fair sample of things in general with respect to the factor of being black.
a 2-adic relation L c X x Y may be formulated as follows:
 
  
L_u@X  =  {<x, y> in L : x = u}
+
Should this hold, the consequence would be:
  
      = the set of all ordered pairs in L incident with u in X.
+
{| align="center" cellspacing="6" width="90%"
 +
| <math>[\mathrm{m,}\mathrm{b}] ~=~ [\mathrm{m,}][\mathrm{b}].</math>
 +
|}
  
L_v@Y  =  {<x, y> in L : y = v}
+
When <math>[\mathrm{b}]\!</math> is not zero, we obtain the result:
  
      = the set of all ordered pairs in L incident with v in Y.
+
{| align="center" cellspacing="6" width="90%"
 +
| <math>[\mathrm{m,}] ~=~ \frac{[\mathrm{m,}\mathrm{b}]}{[\mathrm{b}]}.</math>
 +
|}
  
A sufficient illustration is supplied by the earlier example E.
+
As before, it is convenient to represent the absolute term <math>\mathrm{b} = \text{black}\!</math> by means of the corresponding idempotent term <math>\mathrm{b,} = \text{black that is}\,\underline{~~ ~~}.</math>
  
0  1  2  3  4  5  6  7  8  9
+
Consider the bigraph for the composition:
o  o  o  o  o  o  o  o  o  o  X
 
    \  |\ /|\  \  \  |  |\
 
      \ | / | \  \  \ |  | \        E
 
      \|/ \|  \  \  \|  |  \
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
The local flag E_3@X is displayed here:
+
{| align="center" cellspacing="6" width="90%"
 +
| <math>\mathrm{m,}\mathrm{b} ~=~ \text{man that is black}.</math>
 +
|}
  
0  1  2  3  4  5  6  7  8  9
+
This is represented below in the equivalent form:
o  o  o  o  o  o  o  o  o  o  X
 
          /|\
 
          / | \                        E_3@X
 
        /  |  \
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
The local flag E_2@Y is displayed here:
+
{| align="center" cellspacing="6" width="90%"
 +
| <math>\mathrm{m,}\mathrm{b,} ~=~ \text{man that is black that is}\,\underline{~~ ~~}.</math>
 +
|}
  
0  1  2  3  4  5  6  7  8  9
+
{| align="center" cellpadding="10"
o  o  o  o  o  o  o  o  o  o  X
+
| [[Image:LOR 1870 Figure 53.jpg]] || (53)
    \  | /
+
|}
      \ | /                            E_2@Y
 
      \|/
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
 +
Thus we observe one of the more factitious facts affecting this very special universe of discourse, namely:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| <math>\mathrm{m,}\mathrm{b} ~=~ \mathrm{b}.</math>
 +
|}
  
LOR. Commentary Note 11.8
+
This is equivalent to the implication <math>\mathrm{b} \Rightarrow \mathrm{m}</math> that Peirce would have written in the form <math>\mathrm{b} ~-\!\!\!<~ \mathrm{m}.</math>
  
 +
That is enough to puncture any notion that <math>\mathrm{b}\!</math> and <math>\mathrm{m}\!</math> are statistically independent, but let us continue to develop the plot a bit more.  Putting all the general formulas and particular facts together, we arrive at the following summation of the situation in the ''Othello'' case:
  
 +
If the fair sampling condition were true, it would have the following consequence:
  
Now let's re-examine the "numerical incidence properties" of relations,
+
{| align="center" cellspacing="6" width="90%"
concentrating on the definitions of the assorted regularity conditions.
+
| <math>[\mathrm{m,}] ~=~ \frac{[\mathrm{m,}\mathrm{b}]}{[\mathrm{b}]} ~=~ \frac{[\mathrm{b}]}{[\mathrm{b}]} ~=~ \mathfrak{1}.</math>
 +
|}
  
| For instance, L is said to be "c-regular at j" if and only if
+
On the contrary, we have the following fact:
| the cardinality of the local flag L_x@j is c for all x in X_j,
 
| coded in symbols, if and only if |L_x@j| = c for all x in X_j.
 
|
 
| In a similar fashion, one can define the NIP's "<c-regular at j",
 
| ">c-regular at j", and so on.  For ease of reference, I record a
 
| few of these definitions here:
 
|
 
| L is  c-regular at j      iff  |L_x@j|  = c for all x in X_j.
 
|
 
| L is (<c)-regular at j    iff  |L_x@j|  < c for all x in X_j.
 
|
 
| L is (>c)-regular at j    iff  |L_x@j|  > c for all x in X_j.
 
|
 
| L is (=<c)-regular at j  iff  |L_x@j|  =< c for all x in X_j.
 
|
 
| L is (>=c)-regular at j  iff  |L_x@j|  >= c for all x in X_j.
 
  
Clearly, if any relation is (=<c)-regular on one
+
{| align="center" cellspacing="6" width="90%"
of its domains X_j and also (>=c)-regular on the
+
| <math>[\mathrm{m,}] ~=~ \frac{[\mathrm{m,}\mathbf{1}]}{[\mathbf{1}]} ~=~ \frac{[\mathrm{m}]}{[\mathbf{1}]} ~=~ \frac{4}{7}.\!</math>
same domain, then it must be (=c)-regular on the
+
|}
affected domain X_j, in effect, c-regular at j.
 
  
For example, let G = {r, s, t} and H = {1, ..., 9},
+
In sum, it is not the case in the ''Othello'' example that &ldquo;men are just as apt to be black as things in general&rdquo;.
and consider the 2-adic relation F c G x H that is
 
bigraphed here:
 
  
    r          s          t
+
Expressed in terms of probabilities:  <math>\mathrm{P}(\mathrm{m}) = \frac{4}{7}</math> and <math>\mathrm{P}(\mathrm{b}) = \frac{1}{7}.</math>
    o          o          o      G
 
  /|\         /|\         /|\
 
  / | \       / | \       / | \     F
 
/  |  \    /  |  \    /  |  \
 
o  o  o  o  o  o  o  o  o  H
 
1   2  3  4  5  6  7   8  9
 
  
We observe that F is 3-regular at G and 1-regular at H.
+
If these were independent terms we would have:  <math>\mathrm{P}(\mathrm{m}\mathrm{b}) = \frac{4}{49}.</math>
  
 +
In point of fact, however, we have:  <math>\mathrm{P}(\mathrm{m}\mathrm{b}) = \mathrm{P}(\mathrm{b}) = \frac{1}{7}.</math>
  
 +
Another way to see it is to observe that:  <math>\mathrm{P}(\mathrm{b}|\mathrm{m}) = \frac{1}{4}</math> while <math>\mathrm{P}(\mathrm{b}) = \frac{1}{7}.</math>
  
LOR.  Commentary Note 11.9
+
===Commentary Note 11.23===
  
 +
Peirce's description of logical conjunction and conditional probability via the logic of relatives and the mathematics of relations is critical to understanding the relationship between logic and measurement, in effect, the qualitative and quantitative aspects of inquiry.  To ground this connection firmly in mind, I will try to sum up as succinctly as possible, in more current notation, the lesson we ought to take away from Peirce's last &ldquo;number of&rdquo; example, since I know the account I have given so far may appear to have wandered widely.
  
 +
'''NOF 4.4'''
  
Among the vast variety of conceivable regularities affecting 2-adic relations,
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
we pay special attention to the c-regularity conditions where c is equal to 1.
 
 
 
| Let P c X x Y be an arbitrary 2-adic relation.
 
| The following properties of P can be defined:
 
 
|
 
|
| P is "total" at X    iff  P is (>=1)-regular at X.
+
<p>So if men are just as apt to be black as things in general,</p>
 +
|-
 +
| align="center" | <math>[\mathrm{m,}][\mathrm{b}] ~=~ [\mathrm{m,}\mathrm{b}],\!</math>
 +
|-
 
|
 
|
| P is "total" at Y    iff  P is (>=1)-regular at Y.
+
<p>where the difference between <math>[\mathrm{m}]\!</math> and <math>[\mathrm{m,}]\!</math> must not be overlooked.</p>
|
 
| P is "tubular" at X  iff  P is (=<1)-regular at X.
 
|
 
| P is "tubular" at Y  iff  P is (=<1)-regular at Y.
 
  
We have already looked at 2-adic relations that
+
<p>(Peirce, CP 3.76).</p>
separately exemplify each of these regularities.
+
|}
  
Also, we introduced a few bits of additional terminology and
+
In different lights the formula <math>[\mathrm{m,}\mathrm{b}] = [\mathrm{m,}][\mathrm{b}]\!</math> presents itself as an ''aimed arrow'', ''fair sampling'', or ''statistical independence'' condition.  The concept of independence was illustrated above by means of a case where independence fails.  The details of that counterexample are summarized below.
special-purpose notations for working with tubular relations:
 
  
| P is a "pre-function" P : X ~> Y  iff  P is tubular at X.
+
{| align="center" cellpadding="10"
|
+
| [[Image:LOR 1870 Figure 53.jpg]] || (54)
| P is a "pre-function" P : X <~ Y  iff  P is tubular at Y.
+
|}
  
Thus, we arrive by way of this winding stair at the very special stamps
+
The condition that &ldquo;men are just as apt to be black as things in general&rdquo; is expressed in terms of conditional probabilities as <math>\mathrm{P}(\mathrm{b}|\mathrm{m}) = \mathrm{P}(\mathrm{b}),\!</math> which means that the probability of the event <math>\mathrm{b}\!</math> given the event <math>\mathrm{m}\!</math> is equal to the unconditional probability of the event <math>\mathrm{b}.\!</math>
of 2-adic relations P c X x Y that are "total prefunctions" at X (or Y),
 
"total and tubular" at X (or Y), or "1-regular" at X (or Y), more often
 
celebrated as "functions" at X (or Y).
 
  
| If P is a pre-function P : X ~> Y that happens to be total at X, then P
+
In the ''Othello'' example, it is enough to observe  that <math>\mathrm{P}(\mathrm{b}|\mathrm{m}) = \tfrac{1}{4}\!</math> while <math>\mathrm{P}(\mathrm{b}) = \tfrac{1}{7}\!</math> in order to recognize the bias or dependency of the sampling map.
| is known as a "function" from X to Y, typically indicated as P : X -> Y.
 
|
 
| To say that a relation P c X x Y is totally tubular at X is to say that
 
| it is 1-regular at X.  Thus, we may formalize the following definitions:
 
|
 
| P is a "function" p : X -> Y  iff  P is 1-regular at X.
 
|
 
| P is a "function" p : X <- Y  iff  P is 1-regular at Y.
 
  
For example, let X = Y = {0, ..., 9} and let F c X x Y be
+
The reduction of a conditional probability to an absolute probability, as <math>\mathrm{P}(A|Z) = \mathrm{P}(A),\!</math> is one of the ways we come to recognize the condition of independence, <math>\mathrm{P}(AZ) = \mathrm{P}(A)P(Z),\!</math> via the definition of conditional probability, <math>\mathrm{P}(A|Z) = \displaystyle{\mathrm{P}(AZ) \over \mathrm{P}(Z)}.\!</math>
the 2-adic relation that is depicted in the bigraph below:
 
  
0  1  2  3  4  5  6  7  8  9
+
To recall the derivation, the definition of conditional probability plus the independence condition yields <math>\mathrm{P}(A|Z) = \displaystyle{\mathrm{P}(AZ) \over P(Z)} = \displaystyle{\mathrm{P}(A)\mathrm{P}(Z) \over \mathrm{P}(Z)},\!</math> in short, <math>\mathrm{P}(A|Z) = \mathrm{P}(A).\!</math>
o  o  o  o  o  o  o  o  o  o  X
 
\ /      /|\   \     |  |\   \
 
  \      / | \   \     |  | \   \     F
 
/ \     / \   \    |   |  \   \
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
We observe that F is a function at Y,
+
As Hamlet discovered, there's a lot to be learned from turning a crank.
and we record this fact in either of
 
the manners F : X <- Y or F : Y -> X.
 
  
 +
===Commentary Note 11.24===
  
 +
We come to the end of the &ldquo;number of&rdquo; examples that we found on our agenda at this point in the text:
  
LOR. Commentary Note 11.10
+
'''NOF 4.5'''
  
 
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 
 
In the case of a 2-adic relation F c X x Y that has
 
the qualifications of a function f : X -> Y, there
 
are a number of further differentia that arise:
 
 
 
| f is "surjective"  iff  f is total at Y.
 
 
|
 
|
| f is "injective"   iff  f is tubular at Y.
+
<p>It is to be observed that</p>
 +
|-
 +
| align="center" | <math>[\mathit{1}] ~=~ 1.</math>
 +
|-
 
|
 
|
| f is "bijective"    iff  f is 1-regular at Y.
+
<p>Boole was the first to show this connection between logic and probabilities. He was restricted, however, to absolute terms.  I do not remember having seen any extension of probability to relatives, except the ordinary theory of ''expectation''.</p>
  
For example, or more precisely, contra example,
+
<p>Our logical multiplication, then, satisfies the essential conditions of multiplication, has a unity, has a conception similar to that of admitted multiplications, and contains numerical multiplication as a case under it.</p>
the function f : X -> Y that is depicted below
 
is neither total at Y nor tubular at Y, and so
 
it cannot enjoy any of the properties of being
 
sur-, or in-, or bi-jective.
 
  
0  1  2   3  4  5  6  7  8  9
+
<p>(Peirce, CP 3.76 and CE 2, 376).</p>
o  o  o  o  o  o  o  o  o  o  X
+
|}
|    \  |  /    \  \  |  |    \ /
 
|    \ | /       \  \ |  |    \    f
 
|     \|/        \  \|  |    / \
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
A cheap way of getting a surjective function out of any function
+
There are problems with the printing of the text at this pointLet us first recall the conventions we are using in this transcription, in particular, <math>\mathit{1}\!</math> for the italic 1 that signifies the dyadic identity relation and <math>\mathfrak{1}</math> for the &ldquo;antique figure one&rdquo; that Peirce defines as <math>\mathit{1}_\infty = \text{something}.</math>
is to reset its codomain to its rangeFor example, the range
 
of the function f above is Y'=  {0, 2, 5, 6, 7, 8, 9}.  Thus,
 
if we form a new function g : X -> Y' that looks just like
 
f on the domain X but is assigned the codomain Y', then
 
g is surjective, and is described as mapping "onto" Y'.
 
  
1   2  3  4  5  6  7  8  9
+
CP&nbsp;3 gives <math>[\mathit{1}] = \mathfrak{1},</math> which I cannot make sense of. CE&nbsp;2 gives the 1's in different styles of italics, but reading the equation as <math>[\mathit{1}] = 1,\!</math> makes the best sense if the &ldquo;1&rdquo; on the right hand side is read as the numeral &ldquo;1&rdquo; that denotes the natural number 1, and not as the absolute term &ldquo;1&rdquo; that denotes the universe of discourse. Read this way, <math>[\mathit{1}]\!</math> is the average number of things related by the identity relation <math>\mathit{1}\!</math> to one individual, and so it makes sense that <math>[\mathit{1}] = 1 \in \mathbb{N},</math> where <math>\mathbb{N}</math> is the set of non-negative integers <math>\{ 0, 1, 2, \ldots \}.</math>
o  o  o  o  o  o  o  o  o  o  X
 
|    |  /    \   |  |    \ /
 
|    \ | /       \   \ |  |    \     g
 
|      \|/         \  \|  |    / \
 
o      o          o  o  o  o  o  Y'
 
0       2           5  6  7  8  9
 
  
The function h : Y' -> Y is injective.
+
With respect to the relative term <math>^{\backprime\backprime} \mathit{1} ^{\prime\prime}</math> in the syntactic domain <math>S\!</math> and the number <math>1\!</math> in the non-negative integers <math>\mathbb{N} \subset \mathbb{R},</math> we have:
  
0      2          5  6   7  8  9
+
{| align="center" cellspacing="6" width="90%"
o      o          o  o  o  o  o  Y'
+
| <math>v(\mathit{1}) ~=~ [\mathit{1}] ~=~ 1.</math>
|      |           \ /    |    \ /
+
|}
|       |            \    |    \    h
 
|      |            / \    |    / \
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
The function m : X -> Y is bijective.
+
And so the &ldquo;number of&rdquo; mapping <math>v : S \to \mathbb{R}</math> has another one of the properties that would be required of an arrow <math>S \to \mathbb{R}.</math>
  
0  1  2  3  4  5  6  7  8  9
+
The manner in which these arrows and qualified arrows help us to construct a suspension bridge that unifies logic, semiotics, statistics, stochastics, and information theory will be one of the main themes I aim to elaborate throughout the rest of this inquiry.
o  o  o  o  o  o  o  o  o  o  X
 
|  |  |    \ /    \ /    |    \ /
 
|  |  |    \      \    |    \    m
 
|  |  |    / \    / \    |    / \
 
o  o  o  o  o  o  o  o  o  o  Y
 
0  1  2  3  4  5  6  7  8  9
 
  
 +
==Selection 12==
  
 +
===The Sign of Involution===
  
LOR. Commentary Note 11.11
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>I shall take involution in such a sense that <math>x^y\!</math> will denote everything which is an <math>x\!</math> for every individual of <math>y.\!</math>&nbsp; Thus <math>\mathit{l}^\mathrm{w}\!</math> will be a lover of every woman.&nbsp; Then <math>(\mathit{s}^\mathit{l})^\mathrm{w}\!</math> will denote whatever stands to every woman in the relation of servant of every lover of hers;&nbsp; and <math>\mathit{s}^{(\mathit{l}\mathrm{w})}\!</math> will denote whatever is a servant of everything that is lover of a woman.&nbsp; So that</p>
 +
|-
 +
| align="center" | <math>(\mathit{s}^\mathit{l})^\mathrm{w} ~=~ \mathit{s}^{(\mathit{l}\mathrm{w})}.\!</math>
 +
|-
 +
|
 +
<p>(Peirce, CP 3.77).</p>
 +
|}
  
 +
===Commentary Note 12.1===
  
 +
To get a better sense of why the above formulas mean what they do, and to prepare the ground for understanding more complex relational expressions, it will help to assemble the following materials and definitions:
  
The preceding exercises were intended to beef-up our
+
{| align="center" cellspacing="6" width="90%"
functional literacy skills to the point where we can
+
| height="40" | <math>X\!</math> is a set singled out in a particular discussion as the ''universe of discourse''.
read our functional alphabets backwards and forwards
+
|-
and to ferret out the local functionalites that may
+
| height="40" | <math>W \subseteq X\!</math> is the 1-adic relation, or set, whose elements fall under the absolute term <math>\mathrm{w} = \text{woman}.\!</math>  The elements of <math>W\!</math> are sometimes referred to as the ''denotation'' or the set-theoretic ''extension'' of the term <math>\mathrm{w}.\!</math>
be immanent in relative terms no matter where they
+
|-
locate themselves within the domains of relations.
+
| height="40" | <math>L \subseteq X \times X\!</math> is the 2-adic relation associated with the relative term <math>\mathit{l} = \text{lover of}\,\underline{~~ ~~}.\!</math>
I am hopeful that these skills will serve us in
+
|-
good stead as we work to build a catwalk from
+
| height="40" | <math>S \subseteq X \times X\!</math> is the 2-adic relation associated with the relative term <math>\mathit{s} = \text{servant of}\,\underline{~~ ~~}.\!</math>
Peirce's platform to contemporary scenes on
+
|}
the logic of relatives, and back again.
 
  
By way of extending a few very tentative plancks,
+
{| align="center" cellspacing="6" width="90%"
let us experiment with the following definitions:
+
| height="40" | <math>\mathsf{W} = (\mathsf{W}_x) = \mathrm{Mat}(W) = \mathrm{Mat}(\mathrm{w})</math> is the 1-dimensional matrix representation of the set <math>W\!</math> and the term <math>\mathrm{w}.\!</math>
 +
|-
 +
| height="40" | <math>\mathsf{L} = (\mathsf{L}_{xy}) = \mathrm{Mat}(L) = \mathrm{Mat}(\mathit{l})~\!</math> is the 2-dimensional matrix representation of the relation <math>L\!</math> and the relative term <math>\mathit{l}.\!</math>
 +
|-
 +
| height="40" | <math>\mathsf{S} = (\mathsf{S}_{xy}) = \mathrm{Mat}(S) = \mathrm{Mat}(\mathit{s})\!</math> is the 2-dimensional matrix representation of the relation <math>S\!</math> and the relative term <math>\mathit{s}.~\!</math>
 +
|}
  
1.  A relative term 'p' and the corresponding relation P c X x Y are both
+
Recalling a few definitions, the ''local flags'' of the relation <math>L\!</math> are given as follows:
    called "functional on relates" if and only if P is a function at X,
 
    in symbols, P : X -> Y.
 
  
2.  A relative term 'p' and the corresponding relation P c X x Y are both
+
{| align="center" cellspacing="6" width="90%"
    called "functional on correlates" if and only if P is function at Y,
+
|
    in symbols, P : X <- Y.
+
<math>\begin{array}{lll}
 +
u \star L
 +
& = & L_{u \,\text{at}\, 1}
 +
\\[6pt]
 +
& = & \{ (u, x) \in L \}
 +
\\[6pt]
 +
& = & \text{the ordered pairs in}~ L ~\text{that have}~ u ~\text{in the 1st place}.
 +
\\[9pt]
 +
L \star v
 +
& = & L_{v \,\text{at}\, 2}
 +
\\[6pt]
 +
& = & \{ (x, v) \in L \}
 +
\\[6pt]
 +
& = & \text{the ordered pairs in}~ L ~\text{that have}~ v ~\text{in the 2nd place}.
 +
\end{array}\!</math>
 +
|}
  
When a relation happens to be a function, it may be excusable
+
The ''applications'' of the relation <math>L\!</math> are defined as follows:
to use the same name for it in both applications, writing out
 
explicit type markers like P : X x Y, P : X -> Y, P : X <- Y,
 
as the case may be, when and if it serves to clarify matters.
 
  
From this current, perhaps transient, perspective, it appears that
+
{| align="center" cellspacing="6" width="90%"
our next task is to examine how the known properties of relations
+
|
are modified when an aspect of functionality is spied in the mix.
+
<math>\begin{array}{lll}
 +
u \cdot L
 +
& = & \mathrm{proj}_2 (u \star L)
 +
\\[6pt]
 +
& = & \{ x \in X : (u, x) \in L \}
 +
\\[6pt]
 +
& = & \text{loved by}~ u.
 +
\\[9pt]
 +
L \cdot v
 +
& = & \mathrm{proj}_1 (L \star v)
 +
\\[6pt]
 +
& = & \{ x \in X : (x, v) \in L \}
 +
\\[6pt]
 +
& = & \text{lover of}~ v.
 +
\end{array}\!</math>
 +
|}
  
Let us then return to our various ways of looking at relational composition,
+
===Commentary Note 12.2===
and see what changes and what stays the same when the relations in question
 
happen to be functions of various different kinds at some of their domains.
 
  
Here is one generic picture of relational composition,
+
Let us make a few preliminary observations about the operation of ''logical involution'', as Peirce introduces it here:
cast in a style that hews pretty close to the line of
 
potentials inherent in Peirce's syntax of this period.
 
  
o-----------------------------------------------------------o
+
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
|                                                          |
+
|
|                          P o Q                          |
+
<p>I shall take involution in such a sense that <math>x^y\!</math> will denote everything which is an <math>x\!</math> for every individual of <math>y.\!</math>&nbsp; Thus <math>\mathit{l}^\mathrm{w}\!</math> will be a lover of every woman.</p>
|                ____________^____________                |
 
|                /                        \               |
 
|              /     P            Q      \               |
 
|              /       @            @      \             |
 
|            /      / \           / \       \             |
 
|            /       /   \        /  \      \            |
 
|          o      o    o      o    o      o          |
 
|          X      X    Y      Y    Z      Z          |
 
|      1,__#      #'p'__$      $'q'__%      %1          |
 
|          o      o    o      o    o      o          |
 
|            \    /      \    /      \    /            |
 
|            \  /        \  /        \  /            |
 
|              \ /          \ /          \ /              |
 
|              @            @            @              |
 
|              !1!          !1!          !1!              |
 
|                                                          |
 
o-----------------------------------------------------------o
 
Figure 16.  Anything that is a 'p' of a 'q' of Anything
 
  
From this we extract the "hypergraph picture" of relational composition:
+
<p>(Peirce, CP 3.77).</p>
 +
|}
  
o-----------------------------------------------------------o
+
In ordinary arithmetic the ''involution'' <math>x^y,\!</math> or the ''exponentiation'' of <math>x\!</math> to the power of <math>y,\!</math> is the repeated application of the multiplier <math>x\!</math> for as many times as there are ones making up the exponent <math>y.\!</math>
|                                                          |
 
|                P        P o Q        Q                |
 
|                @          @          @                |
 
|                / \         / \         / \               |
 
|              /   \       /   \       /  \              |
 
|              o    o    o    o    o    o              |
 
|              X    Y    X    Z    Y    Z              |
 
|              o    o    o    o    o    o              |
 
|              \    \  /      \  /    /               |
 
|                \    \ /        \ /    /                |
 
|                \    /          \    /                |
 
|                  \  / \        / \  /                  |
 
|                  \ /  \___ ___/  \ /                  |
 
|                    @        @        @                    |
 
|                  !1!      !1!      !1!                  |
 
|                                                          |
 
o-----------------------------------------------------------o
 
Figure 17.  Relational Composition P o Q
 
  
All of the relevant information of these Figures can be compressed
+
In analogous fashion, the logical involution <math>\mathit{l}^\mathrm{w}\!</math> is the repeated application of the term <math>\mathit{l}\!</math> for as many times as there are individuals under the term <math>\mathrm{w}.\!</math>  According to Peirce's interpretive rules, the repeated applications of the base term <math>\mathit{l}\!</math> are distributed across the individuals of the exponent term <math>\mathrm{w}.\!</math>  In particular, the base term <math>\mathit{l}\!</math> is not applied successively in the manner that would give something like &ldquo;a lover of a lover of &hellip; a lover of a woman&rdquo;.
into the form of a "spreadsheet", or constraint satisfaction table:
 
  
Table 18Relational Composition P o Q
+
For example, suppose that a universe of discourse numbers among its contents just three women, <math>\mathrm{W}^{\prime}, \mathrm{W}^{\prime\prime}, \mathrm{W}^{\prime\prime\prime}.</math> This could be expressed in Peirce's notation by writing:
o---------o---------o---------o---------o
 
|        #  !1!  |  !1!  |  !1!  |
 
o=========o=========o=========o=========o
 
|    P    #    X    |    Y    |        |
 
o---------o---------o---------o---------o
 
|    Q    #        |    Y    |    Z    |
 
o---------o---------o---------o---------o
 
|  P o Q  #    X    |        |    Z    |
 
o---------o---------o---------o---------o
 
  
So the following presents itself as a reasonable plan of study:
+
{| align="center" cellspacing="6" width="90%"
Let's see how much easy mileage we can get in our exploration
+
| height="60" | <math>\mathrm{w} ~=~ \mathrm{W}^{\prime} ~+\!\!,~ \mathrm{W}^{\prime\prime} ~+\!\!,~ \mathrm{W}^{\prime\prime\prime}</math>
of functions by adopting the above templates as a paradigm.
+
|}
  
 +
Under these circumstances the following equation would hold:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| height="60" | <math>\mathit{l}^\mathrm{w} ~=~ \mathit{l}^{(\mathrm{W}^{\prime} ~+\!\!,~ \mathrm{W}^{\prime\prime} ~+\!\!,~ \mathrm{W}^{\prime\prime\prime})} ~=~ (\mathit{l}\mathrm{W}^{\prime}), (\mathit{l}\mathrm{W}^{\prime\prime}), (\mathit{l}\mathrm{W}^{\prime\prime\prime}).</math>
 +
|}
  
LORCommentary Note 11.12
+
This says that a lover of every woman in the given universe of discourse is a lover of <math>\mathrm{W}^{\prime}</math> that is a lover of <math>\mathrm{W}^{\prime\prime}</math> that is a lover of <math>\mathrm{W}^{\prime\prime\prime}.</math> In other words, a lover of every woman in this context is a lover of <math>\mathrm{W}^{\prime}</math> and a lover of <math>\mathrm{W}^{\prime\prime}</math> and a lover of <math>\mathrm{W}^{\prime\prime\prime}.</math>
  
 +
The denotation of the term <math>\mathit{l}^\mathrm{w}\!</math> is a subset of <math>X\!</math> that can be obtained as follows:  For each flag of the form <math>L \star x\!</math> with <math>x \in W,\!</math> collect the elements <math>\mathrm{proj}_1 (L \star x)~\!</math> that appear as the first components of these ordered pairs, and then take the intersection of all these subsets.  Putting it all together:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| height="60" | <math>\mathit{l}^\mathrm{w} ~=~ \bigcap_{x \in W} \mathrm{proj}_1 (L \star x) ~=~ \bigcap_{x \in W} L \cdot x</math>
 +
|}
  
Since functions are special cases of 2-adic relations, and since the space
+
It is very instructive to examine the matrix representation of <math>\mathit{l}^\mathrm{w}\!</math> at this point, not the least because it effectively dispels the mystery of the name ''involution''.  First, let us make the following observation.  To say that <math>j\!</math> is a lover of every woman is to say that <math>j\!</math> loves <math>k\!</math> if <math>k\!</math> is a womanThis can be rendered in symbols as follows:
of 2-adic relations is closed under relational composition, in other words,
 
the composition of a couple of 2-adic relations is again a 2-adic relation,
 
we know that the relational composition of a couple of functions has to be
 
a 2-adic relationIf it is also necessarily a function, then we would be
 
justified in speaking of "functional composition", and also of saying that
 
the space of functions is closed under this functional form of composition.
 
  
Just for novelty's sake, let's try to prove this
+
{| align="center" cellspacing="6" width="90%"
for relations that are functional on correlates.
+
| height="60" | <math>j ~\text{loves}~ k ~\Leftarrow~ k ~\text{is a woman}</math>
 +
|}
  
So our task is this:  Given a couple of 2-adic relations,
+
Reading the formula <math>\mathit{l}^\mathrm{w}\!</math> as &ldquo;<math>j\!</math> loves <math>k\!</math> if <math>k\!</math> is a woman&rdquo; highlights the operation of converse implication inherent in it, and this in turn reveals the analogy between implication and involution that accounts for the aptness of the latter name.
P c X x Y and Q c Y x Z, that are functional on correlates,
 
P : X <- Y and Q : Y <- Z, we need to determine whether the
 
relational composition P o Q c X x Z is also P o Q : X <- Z,
 
or not.
 
  
It always helps to begin by recalling the pertinent definitions.
+
The operations defined by the formulas &nbsp; <math>x^y = z\!</math> &nbsp; and &nbsp; <math>(x\!\Leftarrow\!y) = z</math> &nbsp; for <math>x, y, z \in \mathbb{B} = \{ 0, 1 \}</math> are tabulated below:
  
For a 2-adic relation L c X x Y, we have:
+
{| align="center" cellspacing="6" width="90%"
 +
|
 +
<math>
 +
\begin{array}{ccc}
 +
x^y & = & z \\
 +
\hline
 +
0^0 & = & 1 \\
 +
0^1 & = & 0 \\
 +
1^0 & = & 1 \\
 +
1^1 & = & 1
 +
\end{array}
 +
\qquad\qquad\qquad
 +
\begin{array}{ccc}
 +
x\!\Leftarrow\!y & = & z \\
 +
\hline
 +
0\!\Leftarrow\!0 & = & 1 \\
 +
0\!\Leftarrow\!1 & = & 0 \\
 +
1\!\Leftarrow\!0 & = & 1 \\
 +
1\!\Leftarrow\!1 & = & 1
 +
\end{array}
 +
</math>
 +
|}
  
L is a "function" L : X <- Y  iff L is 1-regular at Y.
+
It is clear that these operations are isomorphic, amounting to the same operation of type <math>\mathbb{B} \times \mathbb{B} \to \mathbb{B}.\!</math> All that remains is to see how this operation on coefficient values in <math>\mathbb{B}\!</math> induces the corresponding operations on sets and terms.
  
As for the definition of relational composition,
+
The term <math>\mathit{l}^\mathrm{w}\!</math> determines a selection of individuals from the universe of discourse <math>X\!</math> that may be computed by means of the corresponding operation on coefficient matrices.  If the terms <math>\mathit{l}\!</math> and <math>\mathrm{w}\!</math> are represented by the matrices <math>\mathsf{L} = \mathrm{Mat}(\mathit{l})</math> and <math>\mathsf{W} = \mathrm{Mat}(\mathrm{w}),</math> respectively, then the operation on terms that produces the term <math>\mathit{l}^\mathrm{w}\!</math> must be represented by a corresponding operation on matrices, say, <math>\mathsf{L}^\mathsf{W} = \mathrm{Mat}(\mathit{l})^{\mathrm{Mat}(\mathrm{w})},</math> that produces the matrix <math>\mathrm{Mat}(\mathit{l}^\mathrm{w}).</math>  In other words, the involution operation on matrices must be defined in such a way that the following equations hold:
it is enough to consider the coefficient of the
 
composite on an arbitrary ordered pair like i:j.
 
  
(P o Q)_ij  = Sum_k (P_ik Q_kj).
+
{| align="center" cellspacing="6" width="90%"
 +
| height="60" | <math>\mathsf{L}^\mathsf{W} ~=~ \mathrm{Mat}(\mathit{l})^{\mathrm{Mat}(\mathrm{w})} ~=~ \mathrm{Mat}(\mathit{l}^\mathrm{w})\!</math>
 +
|}
  
So let us begin.
+
The fact that <math>\mathit{l}^\mathrm{w}\!</math> denotes the elements of a subset of <math>X\!</math> means that the matrix <math>\mathsf{L}^\mathsf{W}\!</math> is a 1-dimensional array of coefficients in <math>\mathbb{B}\!</math> that is indexed by the elements of <math>X.\!</math>  The value of the matrix <math>\mathsf{L}^\mathsf{W}\!</math> at the index <math>{u \in X}\!</math> is written <math>(\mathsf{L}^\mathsf{W})_u\!</math> and computed as follows:
  
P : X <- Y, or P being 1-regular at Y, means that there
+
{| align="center" cellspacing="6" width="90%"
is exactly one ordered pair i:k in P for each k in Y.
+
| height="60" | <math>(\mathsf{L}^\mathsf{W})_u ~=~ \prod_{v \in X} \mathsf{L}_{uv}^{\mathsf{W}_v}\!</math>
 +
|}
  
Q : Y <- Z, or Q being 1-regular at Z, means that there
+
===Commentary Note 12.3===
is exactly one ordered pair k:j in Q for each j in Z.
 
  
Thus, there is exactly one ordered pair i:j in P o Q
+
We now have two ways of computing a logical involution that raises a dyadic relative term to the power of a monadic absolute term, for example, <math>\mathit{l}^\mathrm{w}\!</math> for &ldquo;lover of every woman&rdquo;.
for each j in Z, which means that P o Q is 1-regular
 
at Z, and so we have the function P o Q : X <- Z.
 
  
And we are done.
+
The first method operates in the medium of set theory, expressing the denotation of the term <math>\mathit{l}^\mathrm{w}\!</math> as the intersection of a set of relational applications:
  
Bur proofs after midnight must be checked the next day.
+
{| align="center" cellspacing="6" width="90%"
 +
| height="60" | <math>\mathit{l}^\mathrm{w} ~=~ \bigcap_{x \in W} L \cdot x\!</math>
 +
|}
  
 +
The second method operates in the matrix representation, expressing the value of the matrix <math>\mathsf{L}^\mathsf{W}\!</math> with respect to an argument <math>u\!</math> as a product of coefficient powers:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| height="60" | <math>(\mathsf{L}^\mathsf{W})_u ~=~ \prod_{v \in X} \mathsf{L}_{uv}^{\mathsf{W}_v}\!</math>
 +
|}
  
LOR. Commentary Note 11.13
+
Abstract formulas like these are more easily grasped with the aid of a concrete example and a picture of the relations involved.
  
 +
====Example 6====
  
 +
Consider a universe of discourse <math>X\!</math> that is subject to the following data:
  
As we make our way toward the foothills of Peirce's 1870 LOR, there
+
{| align="center" cellspacing="6" width="90%"
is one piece of equipment that we dare not leave the plains without --
 
for there is little hope that "l'or dans les montagnes là" will lie
 
among our prospects without the ready use of its leverage and lifts --
 
and that is a facility with the utilities that are variously called
 
"arrows", "morphisms", "homomorphisms", "structure-preserving maps",
 
and several other names, in accord with the altitude of abstraction
 
at which one happens to be working, at the given moment in question.
 
 
 
As a middle but not too beaten track, I will lay out the definition
 
of a morphism in the forms that we will need right off, in a slight
 
excess of formality at first, but quickly bringing the bird home to
 
roost on more familiar perches.
 
 
 
Let's say that we have three functions J, K, L
 
that have the following types and that satisfy
 
the equation that follows:
 
 
 
| J : X <- Y
 
 
|
 
|
| K : X <- X x X
+
<math>\begin{array}{*{15}{c}}
|
+
X & = & \{ & a, & b, & c, & d, & e, & f, & g, & h, & i & \}
| L : Y <- Y x Y
+
\\[6pt]
|
+
W & = & \{ & d, & f & \}
| J(L(u, v))  =  K(Ju, Jv)
+
\\[6pt]
 +
L & = & \{ & b\!:\!a, & b\!:\!c, & c\!:\!b, & c\!:\!d, & e\!:\!d, & e\!:\!e, & e\!:\!f, & g\!:\!f, & g\!:\!h, & h\!:\!g, & h\!:\!i & \}
 +
\end{array}</math>
 +
|}
  
Our sagittarian leitmotif can be rubricized in the following slogan:
+
Figure 55 shows the placement of <math>W\!</math> within <math>X\!</math> and the placement of <math>L\!</math> within <math>X \times X.\!</math>
  
>->  The image of the ligature is the compound of the images.   <-<
+
{| align="center" cellpadding="10" width="100%"
 +
| width="3%"  | &nbsp;
 +
| width="47%" | [[Image:LOR 1870 Figure 55.jpg]]
 +
| width="50%" | (55)
 +
|}
  
Where J is the "image", K is the "compound", and L is the "ligature".
+
To highlight the role of <math>W\!</math> more clearly, the Figure represents the absolute term <math>{}^{\backprime\backprime} \mathrm{w} {}^{\prime\prime}\!</math> by means of the relative term <math>{}^{\backprime\backprime} \mathrm{w}, \! {}^{\prime\prime}\!</math> that conveys the same information.
  
Figure 19 presents us with a picture of the situation in question.
+
Computing the denotation of <math>\mathit{l}^\mathrm{w}\!</math> by way of the set-theoretic formula, we can show our work as follows:
  
o-----------------------------------------------------------o
+
{| align="center" cellspacing="6" width="90%"
|                                                          |
+
| height="60" | <math>\mathit{l}^\mathrm{w} ~=~ \bigcap_{x \in W} L \cdot x ~=~ L \cdot d ~\cap~ L \cdot f ~=~ \{ c, e \} \cap \{ e, g \} ~=~ \{ e \}</math>
|                       K          L                      |
+
|}
|                      @          @                      |
 
|                      /|\         /|\                     |
 
|                    / | \       / | \                     |
 
|                    v  |  \     v  |  \                   |
 
|                  o  o  o  o  o  o                  |
 
|                  X  X  X  Y  Y  Y                  |
 
|                  o  o  o  o  o  o                  |
 
|                    ^  ^  ^ /  /  /                    |
 
|                    \   \   \   /  /                    |
 
|                      \   \ / \ /  /                      |
 
|                      \   \   \   /                       |
 
|                       \ / \ / \ /                        |
 
|                        @  @  @                        |
 
|                        J  J  J                        |
 
|                                                          |
 
o-----------------------------------------------------------o
 
Figure 19.  Structure Preserving Transformation J : K <- L
 
  
Here, I have used arrowheads to indicate the relational domains
+
With the above Figure in mind, we can visualize the computation of <math>(\mathsf{L}^\mathsf{W})_u = \textstyle\prod_{v \in X} \mathsf{L}_{uv}^{\mathsf{W}_v}\!</math> as follows:
at which each of the relations J, K, L happens to be functional.
 
  
Table 20 gives the constraint matrix version of the same thing.
+
{| align="center" cellspacing="6" width="90%"
 +
| valign="top" | 1.
 +
| Pick a specific <math>u\!</math> in the bottom row of the Figure.
 +
|-
 +
| valign="top" | 2.
 +
| Pan across the elements <math>v\!</math> in the middle row of the Figure.
 +
|-
 +
| valign="top" | 3.
 +
| If <math>u\!</math> links to <math>v\!</math> then <math>\mathsf{L}_{uv} = 1,\!</math> otherwise <math>{\mathsf{L}_{uv} = 0}.\!</math>
 +
|-
 +
| valign="top" | 4.
 +
| If <math>v\!</math> in the middle row links to <math>v\!</math> in the top row then <math>\mathsf{W}_v = 1,\!</math> otherwise <math>\mathsf{W}_v = 0.\!</math>
 +
|-
 +
| valign="top" | 5.
 +
| Compute the value <math>\mathsf{L}_{uv}^{\mathsf{W}_v} = (\mathsf{L}_{uv} \Leftarrow \mathsf{W}_v)\!</math> for each <math>v\!</math> in the middle row.
 +
|-
 +
| valign="top" | 6.
 +
| If any of the values <math>\mathsf{L}_{uv}^{\mathsf{W}_v}\!</math> is <math>0\!</math> then the product <math>\textstyle\prod_{v \in X} \mathsf{L}_{uv}^{\mathsf{W}_v}\!</math> is <math>0,\!</math> otherwise it is <math>1.\!</math>
 +
|}
  
Table 20.  Arrow:  J(L(u, v)) = K(Ju, Jv)
+
As a general observation, we know that the value of <math>(\mathsf{L}^\mathsf{W})_u\!</math> goes to <math>0~\!</math> just as soon as we find a <math>v \in X\!</math> such that <math>\mathsf{L}_{uv} = 0\!</math> and <math>\mathsf{W}_v = 1,\!</math> in other words, such that <math>(u, v) \notin L\!</math> but <math>v \in W.\!</math>  If there is no such <math>v\!</math> then <math>(\mathsf{L}^\mathsf{W})_u = 1.\!</math>
o---------o---------o---------o---------o
 
|        #    J    |    J    |    J    |
 
o=========o=========o=========o=========o
 
|    K    #    X    |    X    |    X    |
 
o---------o---------o---------o---------o
 
|    L    #    Y    |    Y    |    Y    |
 
o---------o---------o---------o---------o
 
  
One way to read this Table is in terms of the informational redundancies
+
Running through the program for each <math>u \in X,\!</math> the only case that produces a non-zero result is <math>(\mathsf{L}^\mathsf{W})_e = 1.\!</math>  That portion of the work can be sketched as follows:
that it schematizes.  In particular, it can be read to say that when one
 
satisfies the constraint in the L row, along with all of the constraints
 
in the J columns, then the constraint in the K row is automatically true.
 
That is one way of understanding the equation: J(L(u, v)) = K(Ju, Jv).
 
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| height="60" | <math>(\mathsf{L}^\mathsf{W})_e ~=~ \prod_{v \in X} \mathsf{L}_{ev}^{\mathsf{W}_v} ~=~ 0^0 \cdot 0^0 \cdot 0^0 \cdot 1^1 \cdot 1^0 \cdot 1^1 \cdot 0^0 \cdot 0^0 \cdot 0^0 ~=~ 1\!</math>
 +
|}
  
 +
===Commentary Note 12.4===
  
LOR. Commentary Note 11.14
+
Peirce next considers a pair of compound involutions, stating an equation between them that is analogous to a law of exponents in ordinary arithmetic, namely, <math>(a^b)^c = a^{bc}.\!</math>
  
 +
{| align="center" cellspacing="6" width="90%" <!--QUOTE-->
 +
|
 +
<p>Then <math>(\mathit{s}^\mathit{l})^\mathrm{w}\!</math> will denote whatever stands to every woman in the relation of servant of every lover of hers;&nbsp; and <math>\mathit{s}^{(\mathit{l}\mathrm{w})}\!</math> will denote whatever is a servant of everything that is lover of a woman.&nbsp; So that</p>
 +
|-
 +
| align="center" | <math>(\mathit{s}^\mathit{l})^\mathrm{w} ~=~ \mathit{s}^{(\mathit{l}\mathrm{w})}.\!</math>
 +
|-
 +
|
 +
<p>(Peirce, CP 3.77).</p>
 +
|}
  
 +
Articulating the compound relative term <math>\mathit{s}^{(\mathit{l}\mathrm{w})}\!</math> in set-theoretic terms is fairly immediate:
  
First, a correction.  Ignore for now the
+
{| align="center" cellspacing="6" width="90%"
gloss that I gave in regard to Figure 19:
+
| height="60" | <math>\mathit{s}^{(\mathit{l}\mathrm{w})} ~=~ \bigcap_{x \in LW} \mathrm{proj}_1 (S \star x) ~=~ \bigcap_{x \in LW} S \cdot x\!</math>
 +
|}
  
| Here, I have used arrowheads to indicate the relational domains
+
On the other hand, translating the compound relative term <math>(\mathit{s}^\mathit{l})^\mathrm{w}\!</math> into a set-theoretic equivalent is less immediate, the hang-up being that we have yet to define the case of logical involution that raises a dyadic relative term to the power of a dyadic relative term.  As a result, it looks easier to proceed through the matrix representation, drawing once again on the inspection of a concrete example.
| at which each of the relations J, K, L happens to be functional.
 
  
It is more like the feathers of the arrows that serve to mark the
+
====Example 7====
relational domains at which the relations J, K, L are functional,
 
but it would take yet another construction to make this precise,
 
as the feathers are not uniquely appointed but many splintered.
 
  
Now, as promised, let's look at a more homely example of a morphism,
+
{| align="center" cellspacing="6" width="90%"
say, any one of the mappings J : R -> R (roughly speaking) that are
+
|
commonly known as "logarithm functions", where you get to pick your
+
<math>\begin{array}{*{15}{c}}
favorite base.  In this case, K(r, s) = r + s and L(u, v) = u . v,
+
X & = & \{ & a, & b, & c, & d, & e, & f, & g, & h, & i\ & \}
and the defining formula J(L(u, v)) = K(Ju, Jv) comes out looking
+
\\[6pt]
like J(u . v) = J(u) + J(v), writing a dot (.) and a plus sign (+)
+
L & = & \{ & b\!:\!a, & b\!:\!c, & c\!:\!b, & c\!:\!d, & e\!:\!d, & e\!:\!e, & e\!:\!f, & g\!:\!f, & g\!:\!h, & h\!:\!g, & h\!:\!i & \}
for the ordinary 2-ary operations of arithmetical multiplication
+
\\[6pt]
and arithmetical summation, respectively.
+
S & = & \{ & b\!:\!a, & b\!:\!c, & d\!:\!c, & d\!:\!d, & d\!:\!e, & f\!:\!e, & f\!:\!f, & f\!:\!g, & h\!:\!g, & h\!:\!i\ & \}
 +
\end{array}</math>
 +
|}
  
o-----------------------------------------------------------o
+
{| align="center" cellpadding="10" width="100%"
|                                                          |
+
| width="3%" | &nbsp;
|                      {+}        {.}                      |
+
| width="47%" | [[Image:LOR 1870 Figure 56.jpg]]
|                      @          @                      |
+
| width="50%" | (56)
|                      /|\        /|\                      |
+
|}
|                     / | \      / | \                    |
 
|                    v  |  \    v | \                    |
 
|                   o  o  o  o  o  o                  |
 
|                  X  X  X  Y  Y  Y                  |
 
|                  o  o  o  o  o  o                  |
 
|                    ^  ^  ^ /  /  /                    |
 
|                    \  \  \  /  /                    |
 
|                      \  \ / \ /  /                      |
 
|                      \  \  \  /                      |
 
|                       \ / \ / \ /                        |
 
|                         @  @  @                        |
 
|                        J  J  J                        |
 
|                                                          |
 
o-----------------------------------------------------------o
 
Figure 21.  Logarithm Arrow J : {+} <- {.}
 
  
Thus, where the "image" J is the logarithm map,
+
There is a &ldquo;servant of every lover of&rdquo; link between <math>u\!</math> and <math>v\!</math> if and only if <math>u \cdot S ~\supseteq~ L \cdot v.\!</math>&nbsp; But the vacuous inclusions, that is, the cases where <math>L \cdot v = \varnothing,\!</math> have the effect of adding non-intuitive links to the mix.
the "compound" K is the numerical sum, and the
 
the "ligature" L is the numerical product, one
 
obtains the immemorial mnemonic motto:
 
  
| The image of the product is the sum of the images.
+
The computational requirements are evidently met by the following formula:
|
 
| J(u . v)  =  J(u) + J(v)
 
|
 
| J(L(u, v))  =  K(Ju, Jv)
 
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| height="60" | <math>(\mathsf{S}^\mathsf{L})_{xy} ~=~ \prod_{p \in X} \mathsf{S}_{xp}^{\mathsf{L}_{py}}\!</math>
 +
|}
  
 +
In other words, <math>(\mathsf{S}^\mathsf{L})_{xy} = 0\!</math> if and only if there exists a <math>{p \in X}\!</math> such that <math>\mathsf{S}_{xp} = 0\!</math> and <math>\mathsf{L}_{py} = 1.\!</math>
  
LOR.  Commentary Note 11.15
+
===Commentary Note 12.5===
  
 +
The equation <math>(\mathit{s}^\mathit{l})^\mathrm{w} = \mathit{s}^{\mathit{l}\mathrm{w}}\!</math> can be verified by establishing the corresponding equation in matrices:
  
 +
{| align="center" cellspacing="6" width="90%"
 +
| height="60" | <math>(\mathsf{S}^\mathsf{L})^\mathsf{W} ~=~ \mathsf{S}^{\mathsf{L}\mathsf{W}}</math>
 +
|}
  
I'm going to elaborate a little further on the subject
+
If <math>\mathsf{A}</math> and <math>\mathsf{B}</math> are two 1-dimensional matrices over the same index set <math>X\!</math> then <math>\mathsf{A} = \mathsf{B}</math> if and only if <math>\mathsf{A}_x = \mathsf{B}_x</math> for every <math>x \in X.</math>  Thus, a routine way to check the validity of <math>(\mathsf{S}^\mathsf{L})^\mathsf{W} = \mathsf{S}^{\mathsf{L}\mathsf{W}}</math> is to check whether the following equation holds for arbitrary <math>x \in X.</math>
of arrows, morphisms, or structure-preserving maps, as
 
a modest amount of extra work at this point will repay
 
ample dividends when it comes time to revisit Peirce's
 
"number of" function on logical terms.
 
  
The "structure" that is being preserved by a structure-preserving map
+
{| align="center" cellspacing="6" width="90%"
is just the structure that we all know and love as a 3-adic relation.
+
| height="60" | <math>((\mathsf{S}^\mathsf{L})^\mathsf{W})_x ~=~ (\mathsf{S}^{\mathsf{L}\mathsf{W}})_x</math>
Very typically, it will be the type of 3-adic relation that defines
+
|}
the type of 2-ary operation that obeys the rules of a mathematical
 
structure that is known as a "group", that is, a structure that
 
satisfies the axioms for closure, associativity, identities,
 
and inverses.
 
  
For example, in the previous case of the logarithm map J, we have the data:
+
Taking both ends toward the middle, we proceed as follows:
  
| J : R <- R (properly restricted)
+
{| align="center" cellspacing="6" width="90%"
|
+
| height="200" |
| K : R <- R x R, where K(r, s) = r + s
+
<math>
|
+
\begin{array}{*{7}{l}}
| L : R <- R x R, where L(u, v) = u . v
+
((\mathsf{S}^\mathsf{L})^\mathsf{W})_x
 +
& = & \displaystyle
 +
\prod_{p \in X} (\mathsf{S}^\mathsf{L})_{xp}^{\mathsf{W}_p}
 +
& = & \displaystyle
 +
\prod_{p \in X} (\prod_{q \in X} \mathsf{S}_{xq}^{\mathsf{L}_{qp}})^{\mathsf{W}_p}
 +
& = & \displaystyle
 +
\prod_{p \in X} \prod_{q \in X} \mathsf{S}_{xq}^{\mathsf{L}_{qp}\mathsf{W}_p}
 +
\\[36px]
 +
(\mathsf{S}^{\mathsf{L}\mathsf{W}})_x
 +
& = & \displaystyle
 +
\prod_{q \in X} \mathsf{S}_{xq}^{(\mathsf{L}\mathsf{W})_q}
 +
& = & \displaystyle
 +
\prod_{q \in X} \mathsf{S}_{xq}^{\sum_{p \in X} \mathsf{L}_{qp} \mathsf{W}_p}
 +
& = & \displaystyle
 +
\prod_{q \in X} \prod_{p \in X} \mathsf{S}_{xq}^{\mathsf{L}_{qp} \mathsf{W}_p}
 +
\end{array}
 +
</math>
 +
|}
  
Real number addition and real number multiplication (suitably restricted)
+
The products commute, so the equation holds.  In essence, the matrix identity turns on the fact that the law of exponents <math>(a^b)^c = a^{bc}\!</math> in ordinary arithmetic holds when the values <math>a, b, c\!</math> are restricted to the boolean domain <math>\mathbb{B} = \{ 0, 1 \}.</math> Interpreted as a logical statement, the law of exponents <math>(a^b)^c = a^{bc}\!</math> amounts to a theorem of propositional calculus that is otherwise expressed in the following ways:
are examples of group operationsIf we write the sign of each operation
 
in braces as a name for the 3-adic relation that constitutes or defines
 
the corresponding group, then we have the following set-up:
 
  
| J : {+} <- {.}
+
{| align="center" cellspacing="6" width="90%"
|
 
| {+} c R x R x R
 
 
|
 
|
| {.} c R x R x R
+
<math>\begin{matrix}
 
+
(a \,\Leftarrow\, b) \,\Leftarrow\, c & = & a \,\Leftarrow\, b \land c
In many cases, one finds that both groups are written with the same
+
\\[8pt]
sign of operation, typically ".", "+", "*", or simple concatenation,
+
(a >\!\!\!-~ b) >\!\!\!-~ c & = & a >\!\!\!-~ bc
but they remain in general distinct whether considered as operations
+
\\[8pt]
or as relations, no matter what signs of operation are used.  In such
+
c ~-\!\!\!< (b ~-\!\!\!< a) & = & cb ~-\!\!\!< a
a setting, our chiasmatic theme may run a bit like these two variants:
+
\\[8pt]
 
+
c \,\Rightarrow\, (b \,\Rightarrow\, a) & = & c \land b \,\Rightarrow\, a
| The image of the sum is the sum of the images.
+
\end{matrix}</math>
|
+
|}
| The image of the product is the product of the images.
 
 
 
Figure 22 presents a generic picture for groups G and H.
 
 
 
o-----------------------------------------------------------o
 
|                                                          |
 
|                      G          H                      |
 
|                      @          @                      |
 
|                      /|\         /|\                     |
 
|                    / | \       / | \                    |
 
|                    v  |  \    v  |  \                    |
 
|                  o  o  o  o  o  o                  |
 
|                  X  X  X  Y  Y  Y                  |
 
|                  o  o  o  o  o  o                  |
 
|                    ^  ^  ^ /  /  /                    |
 
|                    \  \  \  /  /                    |
 
|                      \  \ / \ /  /                      |
 
|                      \  \  \  /                      |
 
|                        \ / \ / \ /                        |
 
|                        @  @  @                        |
 
|                        J  J  J                        |
 
|                                                          |
 
o-----------------------------------------------------------o
 
Figure 22.  Group Homomorphism J : G <- H
 
 
 
In a setting where both groups are written with a plus sign,
 
perhaps even constituting the very same group, the defining
 
formula of a morphism, J(L(u, v)) = K(Ju, Jv), takes on the
 
shape J(u + v) = Ju + Jv, which looks very analogous to the
 
distributive multiplication of a sum (u + v) by a factor J.
 
Hence another popular name for a morphism:  a "linear" map.
 
 
 
 
 
 
 
LOR.  Commentary Note 11.16
 
 
 
 
 
 
 
I think that we have enough material on morphisms now
 
to go back and cast a more studied eye on what Peirce
 
is doing with that "number of" function, the one that
 
we apply to a logical term 't', absolute or relative
 
of any number of correlates, by writing it in square
 
brackets, as ['t'].  It is frequently convenient to
 
have a prefix notation for this function, and since
 
Peirce reserves 'n' to signify 'not', I will try to
 
use 'v', personally thinking of it as a Greek 'nu',
 
which stands for frequency in physics, and which
 
kind of makes sense if we think of frequency as
 
it's habitual in statistics.  End of mnemonics.
 
 
 
My plan will be nothing less plodding than to work through
 
all of the principal statements that Peirce has made about
 
the "number of" function up to our present stopping place
 
in the paper, namely, those that I collected once before
 
and placed at this location:
 
 
 
LOR.COM 11.2.  http://stderr.org/pipermail/inquiry/2004-November/001814.html
 
 
 
NOF 1.
 
 
 
| I propose to assign to all logical terms, numbers;
 
| to an absolute term, the number of individuals it denotes;
 
| to a relative term, the average number of things so related
 
| to one individual.
 
|
 
| Thus in a universe of perfect men ('men'),
 
| the number of "tooth of" would be 32.
 
|
 
| The number of a relative with two correlates would be the
 
| average number of things so related to a pair of individuals;
 
| and so on for relatives of higher numbers of correlates.
 
|
 
| I propose to denote the number of a logical term by
 
| enclosing the term in square brackets, thus ['t'].
 
|
 
| C.S. Peirce, CP 3.65
 
 
 
We may formalize the role of the "number of" function by assigning it
 
a local habitation and a name 'v' : S -> R, where S is a suitable set
 
of signs, called the "syntactic domain", that is ample enough to hold
 
all of the terms that we might wish to number in a given discussion,
 
and where R is the real number domain.
 
 
 
Transcribing Peirce's example, we may let m = "man" and 't' = "tooth of ---".
 
Then 'v'('t') = ['t'] = ['t'm]/[m], that is to say, in a universe of perfect
 
human dentition, the number of the relative term "tooth of ---" is equal to
 
the number of teeth of humans divided by the number of humans, that is, 32.
 
 
 
The 2-adic relative term 't' determines a 2-adic relation T c U x V,
 
where U and V are two universes of discourse, possibly the same one,
 
that hold among other things all of the teeth and all of the people
 
that happen to be under discussion, respectively.
 
 
 
A rough indication of the bigraph for T
 
might be drawn as follows, where I have
 
tried to sketch in just the toothy part
 
of U and the peoply part of V.
 
 
 
t_1    t_32  t_33    t_64  t_65    t_96  ...    ...
 
o  ...  o    o  ...  o    o  ...  o    o  ...  o    U
 
  \ |  /      \ |  /      \ |  /      \  |  /
 
  \ | /        \ | /        \ | /        \ | /      T
 
    \|/          \|/          \|/          \|/
 
    o            o            o            o        V
 
    m_1          m_2          m_3          ...
 
 
 
Notice that the "number of" function 'v' : S -> R
 
needs the data that is represented by this entire
 
bigraph for T in order to compute the value ['t'].
 
 
 
Finally, one observes that this component of T is a function
 
in the direction T : U -> V, since we are counting only those
 
teeth that ideally occupy one and only one mouth of a creature.
 
 
 
 
 
 
 
LOR.  Commentary Note 11.17
 
 
 
 
 
 
 
I think that the reader is beginning to get an inkling of the crucial importance of
 
the "number of" map in Peirce's way of looking at logic, for it's one of the plancks
 
in the bridge from logic to the theories of probability, statistics, and information,
 
in which logic forms but a limiting case at one scenic turnout on the expanding vista.
 
It is, as a matter of necessity and a matter of fact, practically speaking, at any rate,
 
one way that Peirce forges a link between the "eternal", logical, or rational realm and
 
the "secular", empirical, or real domain.
 
 
 
With that little bit of encouragement and exhortation,
 
let us return to the nitty gritty details of the text.
 
 
 
NOF 2.
 
 
 
| But not only do the significations of '=' and '<' here adopted fulfill all
 
| absolute requirements, but they have the supererogatory virtue of being very
 
| nearly the same as the common significations.  Equality is, in fact, nothing
 
| but the identity of two numbers;  numbers that are equal are those which are
 
| predicable of the same collections, just as terms that are identical are those
 
| which are predicable of the same classes.  So, to write 5 < 7 is to say that 5
 
| is part of 7, just as to write f < m is to say that Frenchmen are part of men.
 
| Indeed, if f < m, then the number of Frenchmen is less than the number of men,
 
| and if v = p, then the number of Vice-Presidents is equal to the number of
 
| Presidents of the Senate;  so that the numbers may always be substituted
 
| for the terms themselves, in case no signs of operation occur in the
 
| equations or inequalities.
 
|
 
| C.S. Peirce, CP 3.66
 
 
 
Peirce is here remarking on the principle that the
 
measure 'v' on terms "preserves" or "respects" the
 
prevailing implication, inclusion, or subsumption
 
relations that impose an ordering on those terms.
 
 
 
In these initiatory passages of the text, Peirce is using a single symbol "<"
 
to denote the usual linear ordering on numbers, but also what amounts to the
 
implication ordering on logical terms and the inclusion ordering on classes.
 
Later, of course, he will introduce distinctive symbols for logical orders.
 
 
 
Now, the links among terms, sets, and numbers can be pursued in all directions,
 
and Peirce has already indicated in an earlier paper how he would "construct"
 
the integers from sets, that is, from the aggregate denotations of terms.
 
 
 
We will get back to that at another time.
 
 
 
In the immediate example, we have this sort of statement:
 
 
 
"if f < m, then the number of Frenchmen is less than the number of men"
 
 
 
In symbolic form, this would be written:
 
 
 
f < m  =>  [f] < [m]
 
 
 
Here, the "<" on the left is a logical ordering on syntactic terms
 
while the "<" on the right is an arithmetic ordering on real numbers.
 
 
 
The type of principle that comes up here is usually discussed
 
under the question of whether a map between two ordered sets
 
is "order-preserving" or not.  The general type of question
 
may be formalized in the following way.
 
 
 
Let X_1 be a set with an ordering denoted by "<_1".
 
Let X_2 be a set with an ordering denoted by "<_2".
 
 
 
What makes an ordering what it is will commonly be
 
a set of axioms that defines the properties of the
 
order relation in question.  Since one frequently
 
has occasion to view the same set in the light of
 
several different order relations, one will often
 
resort to explicit forms like (X, <_1), (X, <_2),
 
and so on, to invoke a set with a given ordering.
 
 
 
A map F : (X_1, <_1) -> (X_2, <_2) is "order-preserving"
 
if and only if a statement of a particular form holds
 
for all x and y in (X_1, <_1), specifically, this:
 
 
 
x <_1 y  =>  Fx <_2 Fy
 
 
 
The action of the "number of" map 'v' : (S, <_1) -> (R, <_2)
 
has just this character, as exemplified by its application to
 
the case where x = f = "frenchman" and y = m = "man", like so:
 
 
 
| f < m  =>  [f] < [m]
 
|
 
| f < m  =>  'v'f < 'v'm
 
 
 
Here, to be more exacting, we may interpret the "<" on the left
 
as "proper subsumption", that is, excluding the equality case,
 
while we read the "<" on the right as the usual "less than".
 
 
 
 
 
 
 
LOR.  Commentary Note 11.18
 
 
 
 
 
 
 
There is a comment that I ought to make on the concept of
 
a "structure preserving map", including as a special case
 
the idea of an "order-preserving map".  It seems to be a
 
peculiarity of mathematical usage in general -- at least,
 
I don't think it's just me -- that "preserving structure"
 
always means "preserving 'some', not of necessity 'all',
 
of the structure in question".  People sometimes express
 
this by speaking of "structure preservation in measure",
 
the implication being that any property that is amenable
 
to being qualified in manner is potentially amenable to
 
being quantified in degree, perhaps in such a way as to
 
answer questions like "How structure-preserving is it?".
 
 
 
Let's see how this remark applies to the order-preserving property of
 
the "number of" mapping 'v' : S -> R.  For any pair of absolute terms
 
x and y in the syntactic domain S, we have the following implications,
 
where "-<" denotes the logical subsumption relation on terms and "=<"
 
is the "less than or equal to" relation on the real number domain R.
 
 
 
x -< y  =>  'v'x =< 'v'y
 
 
 
Equivalently:
 
 
 
x -< y  => [x] =< [y]
 
 
 
It is easy to see that nowhere near all of the distinctions that make up
 
the structure of the ordering on the left hand side will be preserved as
 
one passes to the right hand side of these implication statements, but
 
that is not required in order to call the map 'v' "order-preserving",
 
or what is also known as an "order morphism".
 
 
 
 
 
 
 
LOR.  Commentary Note 11.19
 
 
 
 
 
 
 
Up to this point in the LOR of 1870, Peirce has introduced the
 
"number of" measure on logical terms and discussed the extent
 
to which this measure, 'v' : S -> R such that 'v' : s ~> [s],
 
exhibits a couple of important measure-theoretic principles:
 
 
 
1.  The "number of" map exhibits a certain type of "uniformity property",
 
    whereby the value of the measure on a uniformly qualified population
 
    is in fact actualized by each member of the population.
 
 
 
2.  The "number of" map satisfies an "order morphism principle", whereby
 
    the illative partial ordering of logical terms is reflected up to a
 
    partial extent by the arithmetical linear ordering of their measures.
 
 
 
Peirce next takes up the action of the "number of" map on the two types of,
 
loosely speaking, "additive" operations that we normally consider in logic.
 
 
 
NOF 3.
 
 
 
| It is plain that both the regular non-invertible addition and the
 
| invertible addition satisfy the absolute conditions.  (CP 3.67).
 
 
 
The "regular non-invertible addition" is signified by "+,",
 
corresponding to what we'd call the inclusive disjunction
 
of logical terms or the union of their extensions as sets.
 
 
 
The "invertible addition" is signified in algebra by "+",
 
corresponding to what we'd call the exclusive disjunction
 
of logical terms or the symmetric difference of their sets,
 
ignoring many details and nuances that are often important,
 
of course.
 
 
 
| But the notation has other recommendations.  The conception of 'taking together'
 
| involved in these processes is strongly analogous to that of summation, the sum
 
| of 2 and 5, for example, being the number of a collection which consists of a
 
| collection of two and a collection of five.  (CP 3.67).
 
 
 
A full interpretation of this remark will require us to pick up the precise
 
technical sense in which Peirce is using the word "collection", and that will
 
take us back to his logical reconstruction of certain aspects of number theory,
 
all of which I am putting off to another time, but it is still possible to get
 
a rough sense of what he's saying relative to the present frame of discussion.
 
 
 
The "number of" map 'v' : S -> R evidently induces
 
some sort of morphism with respect to logical sums.
 
If this were straightforwardly true, we could write:
 
 
 
|?| 'v'(x +, y)  =  'v'x + 'v'y
 
|?|
 
|?| Equivalently:
 
|?|
 
|?| [x +, y]  =  [x] + [y]
 
 
 
Of course, things are just not that simple in the case
 
of inclusive disjunction and set-theoretic unions, so
 
we'd "probably" invent a word like "sub-additive" to
 
describe the principle that does hold here, namely:
 
 
 
| 'v'(x +, y)  =<  'v'x + 'v'y
 
|
 
| Equivalently:
 
|
 
| [x +, y]  =<  [x] + [y]
 
 
 
This is why Peirce trims his discussion of this point with the following hedge:
 
 
 
| Any logical equation or inequality in which no operation but addition
 
| is involved may be converted into a numerical equation or inequality by
 
| substituting the numbers of the several terms for the terms themselves --
 
| provided all the terms summed are mutually exclusive.  (CP 3.67).
 
 
 
Finally, a morphism with respect to addition,
 
even a contingently qualified one, must do the
 
right stuff on behalf of the additive identity:
 
 
 
| Addition being taken in this sense,
 
|'nothing' is to be denoted by 'zero',
 
| for then:
 
|
 
| x +, 0  =  x
 
|
 
| whatever is denoted by x;  and this is the definition
 
| of 'zero'.  This interpretation is given by Boole, and
 
| is very neat, on account of the resemblance between the
 
| ordinary conception of 'zero' and that of nothing, and
 
| because we shall thus have
 
|
 
| [0]  =  0.
 
|
 
| C.S. Peirce, CP 3.67
 
 
 
With respect to the nullity 0 in S and the number 0 in R, we have:
 
 
 
'v'0  =  [0]  =  0.
 
 
 
In sum, therefor, it also serves that only preserves
 
a due respect for the function of a vacuum in nature.
 
 
 
 
 
 
 
LOR.  Commentary Note 11.20
 
 
 
 
 
 
 
We arrive at the last, for the time being, of
 
Peirce's statements about the "number of" map.
 
 
 
NOF 4.
 
 
 
| The conception of multiplication we have adopted is
 
| that of the application of one relation to another.  ...
 
|
 
| Even ordinary numerical multiplication involves the same idea,
 
| for 2 x 3 is a pair of triplets, and 3 x 2 is a triplet of pairs,
 
| where "triplet of" and "pair of" are evidently relatives.
 
|
 
| If we have an equation of the form:
 
|
 
| xy  =  z
 
|
 
| and there are just as many x's per y as there are
 
|'per' things, things of the universe, then we have
 
| also the arithmetical equation:
 
|
 
| [x][y]  =  [z].
 
|
 
| C.S. Peirce, CP 3.76
 
 
 
Peirce is here observing what we might dub a "contingent morphism"
 
or a "skeptraphotic arrow", if you will.  Provided that a certain
 
condition, to be named and, what is more hopeful, to be clarified
 
in short order, happens to be satisfied, we would find it holding
 
that the "number of" map 'v' : S -> R such that 'v's = [s] serves
 
to preserve the multiplication of relative terms, that is as much
 
to say, the composition of relations, in the form:  [xy] = [x][y].
 
 
 
So let us try to uncross Peirce's manifestly chiasmatic encryption
 
of the condition that is called on in support of this preservation.
 
 
 
Proviso for [xy] = [x][y] --
 
 
 
| there are just as many x's per y
 
| as there are 'per' things<,>
 
| things of the universe ...
 
 
 
I have placed angle brackets around
 
a comma that CP shows but CE omits,
 
not that it helps much either way.
 
So let us resort to the example:
 
 
 
| For instance, if our universe is perfect men, and there
 
| are as many teeth to a Frenchman (perfect understood)
 
| as there are to any one of the universe, then:
 
|
 
| ['t'][f]  =  ['t'f]
 
|
 
| holds arithmetically.  (CP 3.76).
 
 
 
Now that is something that we can sink our teeth into,
 
and trace the bigraph representation of the situation.
 
In order to do this, it will help to recall our first
 
examination of the "tooth of" relation, and to adjust
 
the picture that we sketched of it on that occasion.
 
 
 
Transcribing Peirce's example, we may let m = "man" and 't' = "tooth of ---".
 
Then 'v'('t') = ['t'] = ['t'm]/[m], that is to say, in a universe of perfect
 
human dentition, the number of the relative term "tooth of ---" is equal to
 
the number of teeth of humans divided by the number of humans, that is, 32.
 
 
 
The 2-adic relative term 't' determines a 2-adic relation T c U x V,
 
where U and V are two universes of discourse, possibly the same one,
 
that hold among other things all of the teeth and all of the people
 
that happen to be under discussion, respectively.  To make the case
 
as simple as we can and still cover the point, let's say that there
 
are just four people in our initial universe of discourse, and that
 
just two of them are French.  The bigraphic composition below shows
 
all of the pertinent facts of the case.
 
 
 
T_1    T_32  T_33    T_64  T_65    T_96  T_97    T_128
 
o  ...  o    o  ...  o    o  ...  o    o  ...  o      U
 
  \ |  /      \ |  /      \ |  /      \  |  /
 
  \ | /        \ | /        \ | /        \ | /      't'
 
    \|/          \|/          \|/          \|/
 
    o            o            o            o          V = m = 1
 
                  |                          |
 
                  |                          |        'f'
 
                  |                          |
 
    o            o            o            o          V = m = 1
 
    J            K            L            M
 
 
 
Here, the order of relational composition flows up the page.
 
For convenience, the absolute term f = "frenchman" has been
 
converted by using the comma functor to give the idempotent
 
representation 'f' = f, = "frenchman that is ---", and thus
 
it can be taken as a selective from the universe of mankind.
 
 
 
By way of a legend for the figure, we have the following data:
 
 
 
| m  =  J +, K +, L +, M  =  1
 
|
 
| f  =  K +, M
 
|
 
|'f'  =  K:K +, M:M
 
|
 
|'t'  =  (T_001 +, ... +, T_032):J  +,
 
|        (T_033 +, ... +, T_064):K  +,
 
|        (T_065 +, ... +, T_096):L  +,
 
|        (T_097 +, ... +, T_128):M
 
 
 
Now let's see if we can use this picture
 
to make sense of the following statement:
 
 
 
| For instance, if our universe is perfect men, and there
 
| are as many teeth to a Frenchman (perfect understood)
 
| as there are to any one of the universe, then:
 
|
 
| ['t'][f]  =  ['t'f]
 
|
 
| holds arithmetically.  (CP 3.76).
 
 
 
In the lingua franca of statistics, Peirce is saying this:
 
That if the population of Frenchmen is a "fair sample" of
 
the general population with regard to dentition, then the
 
morphic equation ['t'f] = ['t'][f], whose transpose gives
 
['t'] = ['t'f]/[f], is every bite as true as the defining
 
equation in this circumstance, namely, ['t'] = ['t'm]/[m].
 
 
 
 
 
 
 
LOR.  Commentary Note 11.21
 
 
 
 
 
 
 
One more example and one more general observation, and then we will
 
be all caught up with our homework on Peirce's "number of" function.
 
 
 
| So if men are just as apt to be black as things in general:
 
|
 
| [m,][b]  =  [m,b]
 
|
 
| where the difference between [m] and [m,] must not be overlooked.
 
|
 
| C.S. Peirce, CP 3.76
 
 
 
The protasis, "men are just as apt to be black as things in general",
 
is elliptic in structure, and presents us with a potential ambiguity.
 
If we had no further clue to its meaning, it might be read as either:
 
 
 
1.  Men are just as apt to be black as things in general are apt to be black.
 
 
 
2.  Men are just as apt to be black as men are apt to be things in general.
 
 
 
The second interpretation, if grammatical, is pointless to state,
 
since it equates a proper contingency with an absolute certainty.
 
 
 
So I think it is safe to assume this paraphrase of what Peirce intends:
 
 
 
3.  Men are just as likely to be black as things in general are likely to be black.
 
 
 
Stated in terms of the conditional probability:
 
 
 
4.  P(b|m) =  P(b)
 
 
 
From the definition of conditional probability:
 
 
 
5.  P(b|m)  =  P(b m)/P(m)
 
 
 
Equivalently:
 
 
 
6.  P(b m)  =  P(b|m)P(m)
 
 
 
Thus we may derive the equivalent statement:
 
 
 
7.  P(b m)  =  P(b|m)P(m)  =  P(b)P(m)
 
 
 
And this, of course, is the definition of independent events, as
 
applied to the event of being Black and the event of being a Man.
 
 
 
It seems like a likely guess, then, that this is the content of Peirce's
 
statement about frequencies, [m,b] = [m,][b], in this case normalized to
 
produce the equivalent statement about probabilities:  P(m b) = P(m)P(b).
 
 
 
Let's see if this checks out.
 
 
 
Let n be the number of things in general, in Peirce's lingo, n = [1].
 
On the assumption that m and b are associated with independent events,
 
we get [m,b] = P(m b)n = P(m)P(b)n = P(m)[b] = [m,][b], so we have to
 
interpret [m,] = "the average number of men per things in general" as
 
P(m) = the probability of a thing in general being a man.  Seems okay.
 
 
 
 
 
 
 
LOR.  Commentary Note 11.22
 
 
 
 
 
 
 
Let's look at that last example from a different angle.
 
 
 
| So if men are just as apt to be black as things in general:
 
|
 
| [m,][b]  =  [m,b]
 
|
 
| where the difference between [m] and [m,] must not be overlooked.
 
|
 
| C.S. Peirce, CP 3.76
 
 
 
In different lights the formula [m,b] = [m,][b] presents itself
 
as an "aimed arrow", "fair sample", or "independence" condition.
 
 
 
The example apparently assumes a universe of "things in general",
 
encompassing among other things the denotations of the absolute
 
terms m = "man" and b = "black".  That suggests to me that we
 
might well illustrate this case in relief, by returning to
 
our earlier staging of 'Othello' and seeing how well that
 
universe of dramatic discourse observes the premiss that
 
"men are just as apt to be black as things in general".
 
 
 
Here is the relevant data:
 
 
 
| 1  =  B +, C +, D +, E +, I +, J +, O
 
|
 
| b  =  O
 
|
 
| m  =  C +, I +, J +, O
 
|
 
| 1,  =  B:B +, C:C +, D:D +, E:E +, I:I +, J:J +, O:O
 
|
 
| b,  =  O:O
 
|
 
| m,  =  C:C +, I:I +, J:J +, O:O
 
 
 
The "fair sampling" or "episkeptral arrow" condition is tantamount to this:
 
"Men are just as apt to be black as things in general are apt to be black".
 
In other words, men are a fair sample of things in general with respect to
 
the factor of being black.
 
 
 
Should this hold, the consequence would be:
 
 
 
[m,b]  =  [m,][b].
 
 
 
When [b] is not zero, we obtain the result:
 
 
 
[m,]  =  [m,b]/[b].
 
 
 
Once again, the absolute term b = "black" is most felicitously depicted
 
by way of its idempotent representation 'b' = b, = "black that is ---",
 
and thus it can be taken as a selective from the universe of discourse.
 
 
 
Here is the bigraph for the composition:
 
 
 
m,b  =  "man that is black",
 
 
 
here represented in the equivalent form:
 
 
 
m,b,  =  "man that is black that is ---".
 
 
 
B  C  D  E  I  J  O
 
o  o  o  o  o  o  o  1
 
    |          |  |  |
 
    |          |  |  |  m,
 
    |          |  |  |
 
o  o  o  o  o  o  o  1
 
                        |
 
                        |  b,
 
                        |
 
o  o  o  o  o  o  o  1
 
B  C  D  E  I  J  O
 
 
 
Thus we observe one of the more factitious facts
 
that hold in this universe of discourse, namely:
 
 
 
m,b  =  b.
 
 
 
Another way of saying that is:
 
 
 
b  -<  m.
 
 
 
That in itself is enough to puncture any notion
 
that b and m are statistically independent, but
 
let us continue to develop the plot a bit more.
 
 
 
Putting all of the general formulas and particular facts together,
 
we arrive at following summation of situation in the Othello case:
 
 
 
If the fair sampling condition holds:
 
 
 
[m,]  =  [m,b]/[b]  =  [b]/[b]  =  `1`,
 
 
 
In fact, however, it is the case that:
 
 
 
[m,]  =  [m,1]/[1]  =  [m]/[1]  =  4/7.
 
 
 
In sum, it is not the case in the Othello example that
 
"men are just as apt to be black as things in general".
 
 
 
Expressed in terms of probabilities:  P(m) = 4/7 and P(b) = 1/7.
 
 
 
If these were independent we'd have:  P(mb) = 4/49.
 
 
 
On the contrary, P(mb) = P(b) = 1/7.
 
 
 
Another way to see it is as follows:  P(b|m) = 1/4 while P(b) = 1/7.
 
 
 
 
 
 
 
LOR.  Commentary Note 11.23
 
 
 
 
 
 
 
Let me try to sum up as succinctly as possible the lesson
 
that we ought to take away from Peirce's last "number of"
 
example, since I know that the account that I have given
 
of it so far may appear to have wandered rather widely.
 
 
 
| So if men are just as apt to be black as things in general:
 
|
 
| [m,][b]  =  [m,b]
 
|
 
| where the difference between [m] and [m,] must not be overlooked.
 
|
 
| C.S. Peirce, CP 3.76
 
 
 
In different lights the formula [m,b] = [m,][b] presents itself
 
as an "aimed arrow", "fair sample", or "independence" condition.
 
I had taken the tack of illustrating this polymorphous theme in
 
bas relief, that is, via detour through a universe of discourse
 
where it fails.  Here's a brief reminder of the Othello example:
 
 
 
B  C  D  E  I  J  O
 
o  o  o  o  o  o  o  1
 
    |          |  |  |
 
    |          |  |  |  m,
 
    |          |  |  |
 
o  o  o  o  o  o  o  1
 
                        |
 
                        |  b,
 
                        |
 
o  o  o  o  o  o  o  1
 
B  C  D  E  I  J  O
 
 
 
The condition, "men are just as apt to be black as things in general",
 
is expressible in terms of conditional probabilities as P(b|m) = P(b),
 
written out, the probability of the event Black given the event Male
 
is exactly equal to the unconditional probability of the event Black.
 
 
 
Thus, for example, it is sufficient to observe in the Othello setting
 
that P(b|m) = 1/4 while P(b) = 1/7 in order to cognize the dependency,
 
and thereby to tell that the ostensible arrow is anaclinically biased.
 
 
 
This reduction of a conditional probability to an absolute probability,
 
in the form P(A|Z) = P(A), is a familiar disguise, and yet in practice
 
one of the ways that we most commonly come to recognize the condition
 
of independence P(AZ) = P(A)P(Z), via the definition of a conditional
 
probability according to the rule P(A|Z) = P(AZ)/P(Z).  To recall the
 
familiar consequences, the definition of conditional probability plus
 
the independence condition yields P(A|Z) = P(AZ)/P(Z) = P(A)P(Z)/P(Z),
 
to wit, P(A|Z) = P(A).
 
 
 
As Hamlet discovered, there's a lot to be learned from turning a crank.
 
 
 
 
 
 
 
LOR.  Commentary Note 11.24
 
 
 
 
 
 
 
And so we come to the end of the "number of" examples
 
that we found on our agenda at this point in the text:
 
 
 
| It is to be observed that:
 
|
 
| [!1!]  =  `1`.
 
|
 
| Boole was the first to show this connection between logic and
 
| probabilities.  He was restricted, however, to absolute terms.
 
| I do not remember having seen any extension of probability to
 
| relatives, except the ordinary theory of 'expectation'.
 
|
 
| Our logical multiplication, then, satisfies the essential conditions
 
| of multiplication, has a unity, has a conception similar to that of
 
| admitted multiplications, and contains numerical multiplication as
 
| a case under it.
 
|
 
| C.S. Peirce, CP 3.76
 
 
 
There appears to be a problem with the printing of the text at this point.
 
Let us first recall the conventions that I am using in this transcription:
 
`1` for the "antique 1" that Peirce defines as !1!_oo = "something", and
 
!1! for the "bold 1" that signifies the ordinary 2-identity relation.
 
 
 
CP 3 gives [!1!] = `1`, which I cannot make any sense of.
 
CE 2 gives [!1!] =  1 , which makes sense on the reading
 
of "1" as denoting the natural number 1, and not as the
 
absolute term "1" that denotes the universe of discourse.
 
On this reading, [!1!] is the average number of things
 
related by the identity relation !1! to one individual,
 
and so it makes sense that [!1!] = 1 : N, where "N" is
 
the set or type of the natural numbers {0, 1, 2, ...}.
 
 
 
With respect to the 2-identity !1! in the syntactic domain S
 
and the number 1 in the non-negative integers N c R, we have:
 
 
 
'v'!1!  = [!1!]  =  1.
 
 
 
And so the "number of" mapping 'v' : S -> R has another one
 
of the properties that would be required of an arrow S -> R.
 
 
 
The manner in which these arrows and qualified arrows help us
 
to construct a suspension bridge that unifies logic, semiotics,
 
statistics, stochastics, and information theory will be one of
 
the main themes that I aim to elaborate throughout the rest of
 
this inquiry.
 
 
 
 
 
 
 
LOR.  Note 12
 
 
 
 
 
 
 
| The Sign of Involution
 
|
 
| I shall take involution in such a sense that x^y
 
| will denote everything which is an x for every
 
| individual of y.
 
|
 
| Thus
 
|
 
| 'l'^w
 
|
 
| will be a lover of every woman.
 
|
 
| Then
 
|
 
| ('s'^'l')^w
 
|
 
| will denote whatever stands to every woman in
 
| the relation of servant of every lover of hers;
 
|
 
| and
 
|
 
| 's'^('l'w)
 
|
 
| will denote whatever is a servant of
 
| everything that is lover of a woman.
 
|
 
| So that
 
|
 
| ('s'^'l')^w  =  's'^('l'w).
 
|
 
| C.S. Peirce, CP 3.77
 
|
 
| Charles Sanders Peirce,
 
|"Description of a Notation for the Logic of Relatives,
 
| Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic",
 
|'Memoirs of the American Academy', Volume 9, pages 317-378, 26 January 1870,
 
|'Collected Papers' (CP 3.45-149), 'Chronological Edition' (CE 2, 359-429).
 
 
 
 
 
 
 
LOR.  Commentary Note 12
 
 
 
 
 
 
 
Let us make a few preliminary observations about the
 
"logical sign of involution", as Peirce uses it here:
 
 
 
| The Sign of Involution
 
|
 
| I shall take involution in such a sense that x^y
 
| will denote everything which is an x for every
 
| individual of y.
 
|
 
| Thus
 
|
 
| 'l'^w
 
|
 
| will be a lover of every woman.
 
|
 
| C.S. Peirce, CP 3.77
 
 
 
In arithmetic, the "involution" x^y, or the "exponentiation" of x
 
to the power of y, is the iterated multiplication of the factor x,
 
repeated as many times as there are ones making up the exponent y.
 
 
 
In analogous fashion, 'l'^w is the iterated multiplication of 'l',
 
repeated as many times as there are individuals under the term w.
 
 
 
For example, suppose that the universe of discourse has,
 
among other things, just the three women, W_1, W_2, W_3.
 
This could be expressed in Peirce's notation by writing:
 
 
 
w  =  W_1 +, W_2 +, W_3.
 
 
 
In this setting, we would have:
 
 
 
'l'^w  =  'l'^(W_1 +, W_2 +, W_3)  =  'l'W_1 , 'l'W_2 , 'l'W_3.
 
 
 
That is, a lover of every woman in the universe of discourse
 
would be a lover of W_1 and a lover of W_2 and lover of W_3.
 
 
 
 
 
 
 
LOR.  Note 13
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
LOR.  Work Area
 
 
 
 
 
 
 
Up to this point in the discussion, we have observed that
 
the "number of" map 'v' : S -> R such that 'v's = [s] has
 
the following morphic properties:
 
 
 
0.  [0]  =  0
 
 
 
1.  'v'
 
 
 
2.  x -< y  =>  [x] =< [y]
 
 
 
3.  [x +, y]  =<  [x] + [y]
 
 
 
contingent:
 
 
 
4.  [xy]  =  [x][y]
 
 
 
view relation P c X x Y x Z as related to three functions:
 
 
 
`p_1` c
 
`p_3` c X x Y x Pow(Z)
 
 
 
 
 
f(x)
 
 
 
f(x+y) = f(x) + f(y)
 
 
 
f(p(x, y))  =  q(f(x), f(y))
 
 
 
P(x, y, z)
 
 
 
(f^-1)(y)
 
 
 
f(z(x, y))  =  z'(f(x), f(y))
 
 
 
Definition.  f(x:y:z)  =  (fx:fy:fz).
 
 
 
f(x:y:z)  =  (fx:fy:
 
 
 
x:y:z in R => fx:fy:fz in fR
 
 
 
R(x, y, z) => (fR)(fx, fy, fz)
 
 
 
(L, x, y, z) => (fL, fx, fy, fz)
 
 
 
(x, y, z, L) => (xf, yf, zf, Lf)
 
 
 
(x, y, z, b) => (xf, yf, zf, bf)
 
 
 
 
 
fzxy = z'(fx)(fy)
 
 
 
 
 
        F
 
        o
 
        |
 
        o
 
        / \
 
      o  o
 
                      o
 
                  .  |  .
 
                .    |    .
 
            .        |        .
 
          .          o          .
 
                  . / \ .
 
                .  /  \   .
 
            .    /    \    .
 
          .      o      o      .
 
                    . .    .
 
                    .  .      .
 
                                  .
 
 
 
                     
 
  C o        . / \ .        o
 
    |    .  /  \  .    | CF
 
    |  .    o    o    .  |
 
  f o    .    .    .    o fF
 
    / \ .    .    .      / \
 
  / . \  .              o  o
 
X o    o Y              XF  YF
 
 
 
<u, v, w> in P ->
 
 
 
o---------o---------o---------o---------o
 
|        #    h    |    h    |    f    |
 
o=========o=========o=========o=========o
 
|    P    #    X    |    Y    |    Z    |
 
o---------o---------o---------o---------o
 
|    Q    #    U    |    V    |    W    |
 
o---------o---------o---------o---------o
 
 
 
Products of diagonal extensions:
 
 
 
1,1,  =  !1!!1!
 
 
 
      =  "anything that is anything that is ---"
 
 
 
      =  "anything that is ---"
 
 
 
      =  !1!
 
 
 
m,n  =  "man that is noble" 
 
 
 
    =  (C:C +, I:I +, J:J +, O:O)(C +, D +, O)
 
 
 
    =  C +, O
 
 
 
n,m  =  "noble that is man"
 
 
 
    =  (C:C +, D:D +, O:O)(C +, I +, J +, O)
 
 
 
    =  C +, O
 
 
 
n,w  =  "noble that is woman"
 
 
 
    =  (C:C +, D:D +, O:O)(B +, D +, E)
 
 
 
    =  D
 
 
 
w,n  =  "woman that is noble"
 
 
 
    =  (B:B +, D:D +, E:E)(C +, D +, O)
 
 
 
    =  D
 
 
 
Given a set X and a subset M c X, define e_M,
 
the "idempotent representation" of M over X,
 
as the 2-adic relation e_M c X x X which is
 
the identity relation on M.  In other words,
 
e_M = {<x, x> : x in M}.
 
 
 
Transposing this by steps into Peirce's notation:
 
 
 
e_M  =  {<x, x> : x in M}
 
 
 
    =  {x:x : x in M}
 
 
 
    =  Sum_X |x in M| x:x
 
 
 
'l'  =  "lover of ---"
 
 
 
's'  =  "servant of ---"
 
 
 
'l',  =  "lover that is --- of ---"
 
 
 
's',  =  "servant that is --- of ---"
 
 
 
| But not only may any absolute term be thus regarded as a relative term,
 
| but any relative term may in the same way be regarded as a relative with
 
| one correlate more.  It is convenient to take this additional correlate
 
| as the first one.
 
|
 
| Then:
 
|
 
| 'l','s'w
 
|
 
| will denote a lover of a woman that is a servant of that woman.
 
|
 
| C.S. Peirce, CP 3.73
 
 
 
o~~~~~~~~~o~~~~+~~~~o~~~~~~~~~o~~~~~~~~~o~~~~+~~~~o~~~~~~~~~o
 
o-----------------------------o-----------------------------o
 
|  Objective Framework (OF)  | Interpretive Framework (IF) |
 
o-----------------------------o-----------------------------o
 
|          Objects          |            Signs            |
 
o-----------------------------o-----------------------------o
 
|                                                          |
 
|          C  o---------------                            |
 
|                                                          |
 
|          F  o---------------                            |
 
|                                                          |
 
|          I  o---------------                            |
 
|                                                          |
 
|          O  o---------------                            |
 
|                                                          |
 
|          B  o---------------                            |
 
|                                                          |
 
|          D  o---------------                            |
 
|                                                          |
 
|          E  o---------------                            |
 
|                                o "m"                    |
 
|                                /                          |
 
|                              /                          |
 
|                              /                            |
 
|          o  o  o-----------@                            |
 
|                              \                           |
 
|                              \                          |
 
|                                \                         |
 
|                                o                        |
 
|                                                          |
 
o-----------------------------o-----------------------------o
 
 
 
†‡||§¶
 
@#||$%
 
 
 
quality, reflection, synecdoche
 
 
 
1.  neglect of
 
2.  neglect of
 
3.  neglect of nil?
 
 
 
Now, it's not the end of the story, of course, but it's a start.
 
The significant thing is what is usually the significant thing
 
in mathematics, at least, that two distinct descriptions refer
 
to the same things.  Incidentally, Peirce is not really being
 
as indifferent to the distinctions between signs and things
 
as this ascii text makes him look, but uses a host of other
 
type-faces to distinguish the types and the uses of signs.
 
 
 
 
 
 
 
LOR.  Discussion Note 1
 
 
 
 
 
 
 
GR = Gary Richmond
 
 
 
GR: I wonder if the necessary "elementary triad" spoken of
 
    below isn't somehow implicated in those discussions
 
    "invoking a 'closure principle'".
 
 
 
GR, quoting CSP:
 
 
 
    | CP 1.292.  It can further be said in advance, not, indeed,
 
    | purely a priori but with the degree of apriority that is
 
    | proper to logic, namely, as a necessary deduction from
 
    | the fact that there are signs, that there must be an
 
    | elementary triad.  For were every element of the
 
    | phaneron a monad or a dyad, without the relative
 
    | of teridentity (which is, of course, a triad),
 
    | it is evident that no triad could ever be
 
    | built up.  Now the relation of every sign
 
    | to its object and interpretant is plainly
 
    | a triad.  A triad might be built up of
 
    | pentads or of any higher perissad
 
    | elements in many ways.  But it
 
    | can be proved -- and really
 
    | with extreme simplicity,
 
    | though the statement of
 
    | the general proof is
 
    | confusing -- that no
 
    | element can have
 
    | a higher valency
 
    | than three.
 
 
 
GR: (Of course this passage also directly relates
 
    to the recent thread on Identity and Teridentity.)
 
 
 
Yes, generally speaking, I think that there are deep formal principles here
 
that manifest themselves in these various guises:  the levels of intention
 
or the orders of reflection, the sign relation, pragmatic conceivability,
 
the generative sufficiency of 3-adic relations for all practical intents,
 
and the irreducibility of continuous relations.  I have run into themes
 
in combinatorics, group theory, and Lie algebras that are tantalizingly
 
reminiscent of the things that Peirce says here, but it will take me
 
some time to investigate them far enough to see what's going on.
 
 
 
GR: PS.  I came upon the above passage last night reading through
 
    the Peirce selections in John J. Stuhr's 'Classical American
 
    Philosophy:  Essential Readings and Interpretive Essays',
 
    Oxford University, 1987 (the passage above is found on
 
    pp 61-62), readily available in paperback in a new
 
    edition, I believe.
 
 
 
GR: An aside:  These excerpts in Sturh include versions of a fascinating
 
    "Intellectual Autobiography", Peirce's summary of his scientific,
 
    especially, philosophic accomplishments.  I've seen them published
 
    nowhere else.
 
 
 
 
 
 
 
LOR.  Discussion Note 2
 
 
 
 
 
 
 
BU = Ben Udell
 
JA = Jon Awbrey
 
 
 
BU: I'm in the process of moving back to NYC and have had little opportunity
 
    to do more than glance through posts during the past few weeks, but this
 
    struck me because it sounds something I really would like to know about,
 
    but I didn't understand it:
 
 
 
JA: Notice that Peirce follows the mathematician's usual practice,
 
    then and now, of making the status of being an "individual" or
 
    a "universal" relative to a discourse in progress.  I have come
 
    to appreciate more and more of late how radically different this
 
    "patchwork" or "piecewise" approach to things is from the way of
 
    some philosophers who seem to be content with nothing less than
 
    many worlds domination, which means that they are never content
 
    and rarely get started toward the solution of any real problem.
 
    Just my observation, I hope you understand.
 
 
 
BU: "Many worlds domination", "nothing less than many worlds domination" --
 
    as opposed to the patchwork or piecewise approach.  What is many worlds
 
    domination?  When I hear "many worlds" I think of Everett's Many Worlds
 
    interpretation of quantum mechanics.
 
 
 
Yes, it is a resonance of Edward, Everett, and All the Other Whos in Whoville,
 
but that whole microcosm is itself but the frumious reverberation of Leibniz's
 
Maenadolatry.
 
 
 
More sequitur, though, this is an issue that has simmered beneath
 
the surface of my consciousness for several decades now and only
 
periodically percolates itself over the hyper-critical thrashold
 
of expression.  Let me see if I can a better job of it this time.
 
 
 
The topic is itself a patchwork of infernally recurrent patterns.
 
Here are a few pieces of it that I can remember arising recently:
 
 
 
| Zeroth Law Of Semantics
 
|
 
| Meaning is a privilege not a right.
 
| Not all pictures depict.
 
| Not all signs denote.
 
|
 
| Never confuse a property of a sign,
 
| for instance, existence,
 
| with a sign of a property,
 
| for instance, existence.
 
|
 
| Taking a property of a sign,
 
| for a sign of a property,
 
| is the zeroth sign of
 
| nominal thinking,
 
| and the first
 
| mistake.
 
|
 
| Also Sprach Zero*
 
 
 
A less catchy way of saying "meaning is a privilege not a right"
 
would most likely be "meaning is a contingency not a necessity".
 
But if I reflect on that phrase, it does not quite satisfy me,
 
since a deeper lying truth is that contingency and necessity,
 
connections in fact and connections beyond the reach of fact,
 
depend on a line of distinction that is itself drawn on the
 
scene of observation from the embodied, material, physical,
 
non-point massive, non-purely-spectrelative point of view
 
of an agent or community of interpretation, a discursive
 
universe, an engauged interpretant, a frame of at least
 
partial self-reverence, a hermeneutics in progress, or
 
a participant observer.  In short, this distinction
 
between the contingent and the necessary is itself
 
contingent, which means, among other things, that
 
signs are always indexical at some least quantum.
 
 
 
 
 
 
 
LOR.  Discussion Note 3
 
 
 
 
 
 
 
JR = Joe Ransdell
 
 
 
JR: Would the Kripke conception of the "rigid designator" be an instance
 
    of the "many worlds domination"?  I was struck by your speaking of
 
    the "patchwork or piecewise" approach as well in that it seemed to
 
    me you might be expressing the same general idea that I have usually
 
    thought of in terms of contextualism instead:  I mean the limits it
 
    puts upon what you can say a priori if you really take contextualism
 
    seriously, which is the same as recognizing indexicality as incapable
 
    of elimination, I think.
 
 
 
Yes, I think this is the same ballpark of topics.
 
I can't really speak for what Kripke had in mind,
 
but I have a practical acquaintance with the way
 
that some people have been trying to put notions
 
like this to work on the applied ontology scene,
 
and it strikes me as a lot of nonsense.  I love
 
a good parallel worlds story as much as anybody,
 
but it strikes me that many worlds philosophers
 
have the least imagination of anybody as to what
 
an alternative universe might really be like and
 
so I prefer to read more creative writers when it
 
comes to that.  But serially, folks, I think that
 
the reason why some people evidently feel the need
 
for such outlandish schemes -- and the vast majority
 
of the literature on counterfactual conditionals falls
 
into the same spaceboat as this -- is simply that they
 
have failed to absorb, through the fault of Principian
 
filters, a quality that Peirce's logic is thoroughly
 
steeped in, namely, the functional interpretation
 
of logical terms, that is, as signs referring to
 
patterns of contingencies.  It is why he speaks
 
more often, and certainly more sensibly and to
 
greater effect, of "conditional generals" than
 
of "modal subjunctives".  This is also bound up
 
with that element of sensibility that got lost in
 
the transition from Peircean to Fregean quantifiers.
 
Peirce's apriorities are always hedged with risky bets.
 
 
 
 
 
 
 
LOR.  Discussion Note 4
 
 
 
 
 
 
 
BU = Benjamin Udell
 
 
 
BU: I wish I had more time to ponder the "many-worlds" issue (& that my books
 
    were not currently disappearing into heavily taped boxes).  I had thought
 
    of the piecemeal approach's opposite as the attempt to build a kind of
 
    monolithic picture, e.g., to worry that there is not an infinite number
 
    of particles in the physical universe for the infinity integers.  But
 
    maybe the business with rigid designators & domination of many worlds
 
    has somehow to do with monolithism.
 
 
 
Yes, that's another way of saying it.  When I look to my own priorities,
 
my big worry is that logic as a discipline is not fulfilling its promise.
 
I have worked in too many settings where the qualitative researchers and
 
the quantitative researchers could barely even talk to one an Other with
 
any understanding, and this I recognized as a big block to inquiry since
 
our first notice of salient facts and significant phenomena is usually
 
in logical, natural language, or qualitative forms, while our eventual
 
success in resolving anomalies and solving practical problems depends
 
on our ability to formalize, operationalize, and quantify the issues,
 
even if only to a very partial degree, as it generally turns out.
 
 
 
When I look to the history of how logic has been deployed in mathematics,
 
and through those media in science generally, it seems to me that the
 
Piece Train started to go off track with the 'Principia Mathematica'.
 
All pokes in the rib aside, however, I tend to regard this event
 
more as the symptom of a localized cultural phenomenon than as
 
the root cause of the broader malaise.
 
 
 
 
 
 
 
LOR.  Discussion Note 5
 
 
 
 
 
 
 
CG = Clark Goble
 
JA = Jon Awbrey
 
 
 
JA, quoting CSP:
 
 
 
    | For example,
 
    |
 
    | f + u
 
    |
 
    | means all Frenchmen besides all violinists, and,
 
    | therefore, considered as a logical term, implies
 
    | that all French violinists are 'besides themselves'.
 
 
 
CG: Could you clarify your use of "besides"?
 
 
 
CG: I think I am following your thinking in that you
 
    don't want the logical terms to be considered
 
    to have any necessary identity between them.
 
    Is that right?
 
 
 
I use vertical sidebars "|" for long quotations, so this
 
is me quoting Peirce at CP 3.67 who is explaining in an
 
idiomatic way Boole's use of the plus sign for a logical
 
operation that is strictly speaking limited to terms for
 
mutually exclusive classes.  The operation would normally
 
be extended to signify the "symmetric difference" operator.
 
But Peirce is saying that he prefers to use the sign "+,"
 
for inclusive disjunction, corresponding to the union of
 
the associated classes.  Peirce calls Boole's operation
 
"invertible" because it amounts to the sum operation in
 
a field, whereas the inclusive disjunction or union is
 
"non-invertible", since knowing that A |_| B = C does
 
not allow one to say determinately that A = C - B.
 
I can't recall if Boole uses this 'besides' idiom,
 
but will check later.
 
 
 
 
 
 
 
LOR.  Discussion Note 6
 
 
 
 
 
 
 
CG = Clark Goble
 
JA = Jon Awbrey
 
 
 
JA: I use vertical sidebars "|" for long quotations, so this
 
    is me quoting Peirce at CP 3.67 who is explaining in an
 
    idiomatic way Boole's use of the plus sign for a logical
 
    operation that is strictly speaking limited to terms for
 
    mutually exclusive classes.
 
 
 
CG: Is that essay related to any of the essays
 
    in the two volume 'Essential Peirce'?  I'm
 
    rather interested in how he speaks there.
 
 
 
No, the EP volumes are extremely weak on logical selections.
 
I see nothing there that deals with the logic of relatives.
 
 
 
JA: But Peirce is saying that he prefers to use the sign "+,"
 
    for inclusive disjunction, corresponding to the union of
 
    the associated classes.
 
 
 
CG: The reason I asked was more because it seemed
 
    somewhat interesting in light of the logic of
 
    operators in quantum mechanics.  I was curious
 
    if the use of "beside" might relate to that.
 
    But from what you say it probably was just me
 
    reading too much into the quote.  The issue of
 
    significance was whether the operation entailed
 
    the necessity of mutual exclusivity or whether
 
    some relationship between the classes might be
 
    possible.  I kind of latched on to Peirce's
 
    odd statement about "all French violinists
 
    are 'beside themselves'".
 
 
 
CG: Did Peirce have anything to say about
 
    what we'd call non-commuting operators?
 
 
 
In general, 2-adic relative terms are non-commutative.
 
For example, a brother of a mother is not identical to
 
a mother of a brother.
 
 
 
 
 
 
 
LOR.  Discussion Note 7
 
 
 
 
 
 
 
GR = Gary Richmond
 
 
 
GR: I am very much enjoying, which is to say,
 
    learning from your interlacing commentary
 
    on Peirce's 1870 "Logic of Relatives" paper.
 
 
 
GR: What an extraordinary paper the 1870 "LOG" is!  Your notes helped
 
    me appreciate the importance of the unanticipated proposal of P's
 
    to "assign to all logical terms, numbers".  On the other hand,
 
    the excerpts suggested to we why Peirce finally framed his
 
    Logic of Relatives into graphical form.  Still, I think
 
    that a thorough examination of the 1970 paper might
 
    serve as propaedeutic (and of course, much more)
 
    for the study of the alpha and beta graphs.
 
 
 
Yes, there's gold in them thar early logic papers that has been "panned"
 
but nowhere near mined in depth yet.  The whole quiver of arrows between
 
terms and numbers harks back to the 'numeri characteristici' of  Leibniz,
 
of course, but Leibniz attended more on the intensional chains of being
 
while Peirce will here start to "escavate" the extensional hierarchies.
 
 
 
I consider myself rewarded that you see the incipient impulse toward
 
logical graphs, as one of the most striking things to me about this
 
paper is to see these precursory seeds already planted here within
 
it and yet to know how long it will take them to sprout and bloom.
 
 
 
Peirce is obviously struggling to stay within the linotyper's art --
 
a thing that we, for all our exorbitant hype about markable text,
 
are still curiously saddled with -- but I do not believe that it
 
is possible for any mind equipped with a geometrical imagination
 
to entertain these schemes for connecting up terminological hubs
 
with their terminological terminals without perforce stretching
 
imaginary strings between the imaginary gumdrops.
 
 
 
GR: I must say though that the pace at which you've been throwing this at us
 
    is not to be kept up with by anyone I know "in person or by reputation".
 
    I took notes on the first 5 or 6 Notes, but can now just barely find
 
    time to read through your posts.
 
 
 
Oh, I was trying to burrow as fast as I could toward the more untapped veins --
 
I am guessing that things will probably "descalate" a bit over the next week,
 
but then, so will our attention spans ...
 
 
 
Speaking of which, I will have to break here, and pick up the rest later ...
 
 
 
 
 
 
 
LOR.  Discussion Note 8
 
 
 
 
 
 
 
GR = Gary Richmond
 
 
 
GR: In any event, I wish that you'd comment on Note 5 more directly (though
 
    you do obliquely in your own diagramming of "every [US] Vice-President(s) ...
 
    [who is] every President(s) of the US Senate".
 
 
 
There are several layers of things to say about that,
 
and I think that it would be better to illustrate the
 
issues by way of the examples that Peirce will soon be
 
getting to, but I will see what I can speak to for now.
 
 
 
GR: But what interested me even more in LOR, Note 5, was the sign < ("less than"
 
    joined to the sign of identity = to yield P's famous sign -< (or more clearly,
 
    =<) of inference, which combines the two (so that -< (literally, "as small as")
 
    means "is".  I must say I both "get" this and don't quite (Peirce's example(s) of
 
    the frenchman helped a little).  Perhaps your considerably more mathematical mind
 
    can help clarify this for a non-mathematician such as myself.  (My sense is that
 
    "as small as" narrows the terms so that "everything that occurs in the conclusion
 
    is already contained in the premise.)  I hope I'm not being obtuse here.  I'm sure
 
    it's "all too simple for words".
 
 
 
Then let us draw a picture.
 
 
 
"(F (G))", read "not F without G", means that F (G), that is, F and not G,
 
is the only region exempted from the occupation of being in this universe:
 
 
 
o-----------------------------------------------------------o
 
|`X`````````````````````````````````````````````````````````|
 
|```````````````````````````````````````````````````````````|
 
|`````````````o-------------o```o-------------o`````````````|
 
|````````````/              \`/```````````````\````````````|
 
|```````````/                o`````````````````\```````````|
 
|``````````/                /`\`````````````````\``````````|
 
|`````````/                /```\`````````````````\`````````|
 
|````````/                /`````\`````````````````\````````|
 
|```````o                o```````o`````````````````o```````|
 
|```````|                |```````|`````````````````|```````|
 
|```````|                |```````|`````````````````|```````|
 
|```````|        F        |```````|````````G````````|```````|
 
|```````|                |```````|`````````````````|```````|
 
|```````|                |```````|`````````````````|```````|
 
|```````o                o```````o`````````````````o```````|
 
|````````\                \`````/`````````````````/````````|
 
|`````````\                \```/`````````````````/`````````|
 
|``````````\                \`/`````````````````/``````````|
 
|```````````\                o`````````````````/```````````|
 
|````````````\              /`\```````````````/````````````|
 
|`````````````o-------------o```o-------------o`````````````|
 
|```````````````````````````````````````````````````````````|
 
|```````````````````````````````````````````````````````````|
 
o-----------------------------------------------------------o
 
 
 
Collapsing the vacuous region like soapfilm popping on a wire frame,
 
we draw the constraint (F (G)) in the following alternative fashion:
 
 
 
o-----------------------------------------------------------o
 
|`X`````````````````````````````````````````````````````````|
 
|```````````````````````````````````````````````````````````|
 
|```````````````````````````````o-------------o`````````````|
 
|``````````````````````````````/```````````````\````````````|
 
|`````````````````````````````o`````````````````\```````````|
 
|````````````````````````````/`\`````````````````\``````````|
 
|```````````````````````````/```\`````````````````\`````````|
 
|``````````````````````````/`````\`````````````````\````````|
 
|`````````````````````````o```````o`````````````````o```````|
 
|`````````````````````````|```````|`````````````````|```````|
 
|`````````````````````````|```````|`````````````````|```````|
 
|`````````````````````````|```F```|````````G````````|```````|
 
|`````````````````````````|```````|`````````````````|```````|
 
|`````````````````````````|```````|`````````````````|```````|
 
|`````````````````````````o```````o`````````````````o```````|
 
|``````````````````````````\`````/`````````````````/````````|
 
|```````````````````````````\```/`````````````````/`````````|
 
|````````````````````````````\`/`````````````````/``````````|
 
|`````````````````````````````o`````````````````/```````````|
 
|``````````````````````````````\```````````````/````````````|
 
|```````````````````````````````o-------------o`````````````|
 
|```````````````````````````````````````````````````````````|
 
|```````````````````````````````````````````````````````````|
 
o-----------------------------------------------------------o
 
 
 
So, "(F (G))", "F => G", "F =< G", "F -< G", "F c G",
 
under suitable mutations of interpretation, are just
 
so many ways of saying that the denotation of "F" is
 
contained within the denotation of "G".
 
 
 
Now, let us look to the "characteristic functions" or "indicator functions"
 
of the various regions of being.  It is frequently convenient to ab-use the
 
same letters for them and merely keep a variant interpretation "en thy meme",
 
but let us be more meticulous here, and reserve the corresponding lower case
 
letters "f" and "g" to denote the indicator functions of the regions F and G,
 
respectively.
 
 
 
Taking B = {0, 1} as the boolean domain, we have:
 
 
 
f, g : X -> B
 
 
 
(f^(-1))(1)  = F
 
 
 
(g^(-1))(1)  =  G
 
 
 
In general, for h : X -> B, an expression like "(h^(-1))(1)"
 
can be read as "the inverse of h evaluated at 1", in effect,
 
denoting the set of points in X where h evaluates to "true".
 
This is called the "fiber of truth" in h, and I have gotten
 
where I like to abbreviate it as "[|h|]".
 
 
 
Accordingly, we have:
 
 
 
F  =  [|f|]  =  (f^(-1))(1)  c  X
 
 
 
G  =  [|g|]  =  (g^(-1))(1)  c  X
 
 
 
This brings us to the question, what sort
 
of "functional equation" between f and g
 
goes with the regional constraint (F (G))?
 
 
 
Just this, that f(x) =< g(x) for all x in X,
 
where the '=<' relation on the values in B
 
has the following operational table for
 
the pairing "row head =< column head".
 
 
 
o---------o---------o---------o
 
|  =<    #    0    |    1    |
 
o=========o=========o=========o
 
|    0    #    1    |    1    |
 
o---------o---------o---------o
 
|    1    #    0    |    1    |
 
o---------o---------o---------o
 
 
 
And this, of course, is the same thing as the truth table
 
for the conditional connective or the implication relation.
 
 
 
GR: By the way, in the semiosis implied by the modal gamma graphs,
 
    could -< (were it used there, which of course it is not) ever
 
    be taken to mean,"leads to" or "becomes" or "evolves into"?
 
    I informally use it that way myself, using the ordinary
 
    arrow for implication.
 
 
 
I am a bit insensitive to the need for modal logic,
 
since necessity in mathematics always seems to come
 
down to being a matter of truth for all actual cases,
 
if under an expanded sense of actuality that makes it
 
indiscernible from possibility, so I must beg off here.
 
But there are places where Peirce makes a big deal about
 
the advisability of drawing the '-<' symbol in one fell
 
stroke of the pen, kind of like a "lazy gamma" -- an old
 
texican cattle brand -- and I have seen another place where
 
he reads "A -< B" as "A, in every way that it can be, is B",
 
as if this '-<' fork in the road led into a veritable garden
 
of branching paths.
 
 
 
And out again ...
 
 
 
 
 
 
 
LOR.  Discussion Note 9
 
 
 
 
 
 
 
GR = Gary Richmond
 
JA = Jon Awbrey
 
 
 
JA: I am a bit insensitive to the need for modal logic,
 
    since necessity in mathematics always seems to come
 
    down to being a matter of truth for all actual cases,
 
    if under an expanded sense of actuality that makes it
 
    indiscernible from possibility, so I must beg off here.
 
 
 
GR: I cannot agree with you regarding modal logic.  Personally
 
    I feel that the gamma part of the EG's is of the greatest
 
    interest and potential importance, and as Jay Zeman has
 
    made clear in his dissertation, Peirce certainly thought
 
    this as well.
 
 
 
You disagree that I am insensitive?  Well, certainly nobody has ever done that before!
 
No, I phrased it that way to emphasize the circumstance that it ever hardly comes up
 
as an issue within the limited purview of my experience, and when it does -- as in
 
topo-logical boundary situations -- it seems to require a sort of analysis that
 
doesn't comport all that well with the classical modes and natural figures of
 
speech about it.  Then again, I spent thirty years trying to motorize Alpha,
 
have only a few good clues how I would go about Beta, and so Gamma doesn't
 
look like one of those items on my plate.
 
 
 
Speeching Of Which ---
 
Best Of The Season ...
 
And Happy Trailing ...
 
 
 
 
 
 
 
LOR.  Discussion Note 10
 
 
 
 
 
 
 
BM = Bernard Morand
 
JA = Jon Awbrey
 
 
 
BM: Thanks for your very informative talk.  There
 
    is a point that I did not understand in note 35:
 
 
 
JA: If we operate in accordance with Peirce's example of `g`'o'h
 
    as the "giver of a horse to an owner of that horse", then we
 
    may assume that the associative law and the distributive law
 
    are by default in force, allowing us to derive this equation:
 
 
 
JA: 'l','s'w  =  'l','s'(B +, D +, E)  =  'l','s'B +, 'l','s'D +, 'l','s'E
 
 
 
BM: May be because language or more probably my lack of training in logic, what
 
    does mean that "associative law and distributive law are by default in force"?
 
 
 
Those were some tricky Peirces,
 
and I was trying to dodge them
 
as artful as could be, but now
 
you have fastly apprehended me!
 
 
 
It may be partly that I left out the initial sections of this paper where Peirce
 
discusses how he will regard the ordinarily applicable principles in the process
 
of trying to extend and generalize them (CP 3.45-62), but there may be also an
 
ambiguity in Peirce's use of the phrase "absolute conditions" (CP 3.62-68).
 
Does he mean "absolutely necessary", "indispensable", "inviolate", or
 
does he mean "the conditions applying to the logic of absolute terms",
 
in which latter case we would expect to alter them sooner or later?
 
 
 
We lose the commutative law, xy = yx, as soon as we extend to 2-adic relations,
 
but keep the associative law, x(yz) = (xy)z, as the multiplication of 2-adics
 
is the logical analogue of ordinary matrix multiplication, and Peirce like
 
most mathematicians treats the double distributive law, x(y + z) = xy + xz
 
and (x + y)z = xz + yz, and as something that must be striven to preserve
 
as far as possible.
 
 
 
Strictly speaking, Peirce is already using a principle that goes beyond
 
the ordinary associative law, but that is recognizably analogous to it,
 
for example, in the modified Othello case, where (J:J:D)(J:D)(D) = J.
 
If it were strictly associative, then we would have the following:
 
 
 
1.  (J:J:D)((J:D)(D))  =  (J:J:D)(J)  =  0?
 
 
 
2.  ((J:J:D)(J:D))(D)  =  (J)(D)  =  0?
 
 
 
In other words, the intended relational linkage would be broken.
 
However, the type of product that Peirce is taking for granted
 
in this situation often occurs in mathematics in just this way.
 
There is another location where he comments more fully on this,
 
but I have the sense that it was a late retrospective remark,
 
and I do not recall if it was in CP or in the microfilm MS's
 
that I read it.
 
 
 
By "default" conditions I am referring more or less to what
 
Peirce says at the end of CP 3.69, where he use an argument
 
based on the distributive principle to rationalize the idea
 
that 'A term multiplied by two relatives shows that the same
 
individual is in the two relations'.  This means, for example,
 
that one can let "`g`'o'h", without subjacent marks or numbers,
 
be interpreted on the default convention of "overlapping scopes",
 
where the two correlates of `g` are given by the next two terms
 
in line, namely, 'o' and h, and the single correlate of 'o' is
 
given by the very next term in line, namely, h.  Thus, it is
 
only when this natural scoping cannot convey the intended
 
sense that we have to use more explicit mark-up devices.
 
 
 
BM: About another point:  do you think that the LOR could be of some help to solve
 
    the puzzle of the "second way of dividing signs" where CSP concludes that 66
 
    classes could be made out of the 10 divisions (Letters to lady Welby)?
 
    (As I see them, the ten divisions involve a mix of relative terms,
 
    dyadic relations and a triadic one.  In order to make 66 classes
 
    it is clear that these 10 divisions have to be stated under some
 
    linear order.  The nature of this order is at the bottom of the
 
    disagreements on the subject).
 
 
 
This topic requires a longer excuse from me
 
than I am able to make right now, but maybe
 
I'll get back to it later today or tomorrow.
 
 
 
 
 
 
 
LOR.  Discussion Note 11
 
 
 
 
 
 
 
BM = Bernard Morand
 
 
 
BM: About another point:  do you think that the LOR could be of some help
 
    to solve the puzzle of the "second way of dividing signs" where CSP
 
    concludes that 66 classes could be made out of the 10 divisions
 
    (Letters to lady Welby)?  (As I see them, the ten divisions
 
    involve a mix of relative terms, dyadic relations and
 
    a triadic one.  In order to make 66 classes it is
 
    clear that these 10 divisions have to be stated
 
    under some linear order.  The nature of this
 
    order is at the bottom of the disagreements
 
    on the subject).
 
 
 
Yes.  At any rate, I have a pretty clear sense from reading Peirce's work
 
in the period 1865-1870 that the need to understand the function of signs
 
in scientific inquiry is one of the main reasons he found himself forced
 
to develop both the theory of information and the logic of relatives.
 
 
 
Peirce's work of this period is evenly distributed across the extensional
 
and intensional pans of the balance in a way that is very difficult for us
 
to follow anymore.  I remember when I started looking into this I thought of
 
myself as more of an "intensional, synthetic" than an "extensional, analytic"
 
type of thinker, but that seems like a long time ago, as it soon became clear
 
that much less work had been done in the Peirce community on the extensional
 
side of things, while that was the very facet that needed to be polished up
 
in order to reconnect logic with empirical research and mathematical models.
 
So I fear that I must be content that other able people are working on the
 
intensional classification of sign relations.
 
 
 
Still, the way that you pose the question is very enticing,
 
so maybe it is time for me to start thinking about this
 
aspect of sign relations again, if you could say more
 
about it.
 
 
 
 
 
 
 
LOR.  Discussion Note 12
 
 
 
 
 
 
 
BM = Bernard Morand
 
 
 
BM: The pairing "intensional, synthetic" against the other "extensional, analytic"
 
    is not one that I would have thought so.  I would have paired synthetic with
 
    extensional because synthesis consists in adding new facts to an already made
 
    conception.  On the other side analysis looks to be the determination of
 
    features while neglecting facts.  But may be there is something like
 
    a symmetry effect leading to the same view from two different points.
 
 
 
Oh, it's not too important, as I don't put a lot of faith in such divisions,
 
and the problem for me is always how to integrate the facets of the object,
 
or the faculties of the mind -- but there I go being synthetic again!
 
 
 
I was only thinking of a conventional contrast that used to be drawn
 
between different styles of thinking in mathematics, typically one
 
points to Descartes, and the extensionality of analytic geometry,
 
versus Desargues, and the intensionality of synthetic geometry.
 
 
 
It may appear that one has side-stepped the issue of empiricism
 
that way, but then all that stuff about the synthetic a priori
 
raises its head, and we have Peirce's insight that mathematics
 
is observational and even experimental, and so I must trail off
 
into uncoordinated elliptical thoughts ...
 
 
 
The rest I have to work at a while, and maybe go back to the Welby letters.
 
 
 
 
 
 
 
LOR.  Discussion Note 13
 
 
 
 
 
 
 
BM = Bernard Morand
 
 
 
BM: I will try to make clear the matter, at least as far as I understand it
 
    for now.  We can summarize in a table the 10 divisions with their number
 
    in a first column, their title in current (peircean) language in the second
 
    and some kind of logical notation in the third.  The sources come mainly from
 
    the letters to Lady Welby.  While the titles come from CP 8.344, the third column
 
    comes from my own interpretation.
 
 
 
BM: So we get:
 
 
 
I    - According to the Mode of Apprehension of the Sign itself            - S
 
II  - According to the Mode of Presentation of the Immediate Object        - Oi
 
III  - According to the Mode of Being of the Dynamical Object              - Od
 
IV  - According to the Relation of the Sign to its Dynamical Object        - S-Od
 
V    - According to the Mode of Presentation of the Immediate Interpretant  - Ii
 
VI  - According to the Mode of Being of the Dynamical Interpretant        - Id
 
VII  - According to the relation of the Sign to the Dynamical Interpretant  - S-Id
 
VIII - According to the Nature of the Normal Interpretant                  - If
 
IX  - According to the the relation of the Sign to the Normal Interpretant - S-If
 
X    - According to the Triadic Relation of the Sign to its Dynamical Object
 
      and to its Normal Interpretant                                      - S-Od-If
 
 
 
For my future study, I will reformat the table in a way that I can muse upon.
 
I hope the roman numerals have not become canonical, as I cannot abide them.
 
 
 
Table.  Ten Divisions of Signs (Peirce, Morand)
 
o---o---------------o------------------o------------------o---------------o
 
|  | According To: | Of:              | To:              |              |
 
o===o===============o==================o==================o===============o
 
| 1 | Apprehension  | Sign Itself      |                  | S            |
 
| 2 | Presentation  | Immediate Object |                  | O_i          |
 
| 3 | Being        | Dynamical Object |                  | O_d          |
 
| 4 | Relation      | Sign            | Dynamical Object | S : O_d      |
 
o---o---------------o------------------o------------------o---------------o
 
| 5 | Presentation  | Immediate Interp |                  | I_i          |
 
| 6 | Being        | Dynamical Interp |                  | I_d          |
 
| 7 | Relation      | Sign            | Dynamical Interp | S : I_d      |
 
o---o---------------o------------------o------------------o---------------o
 
| 8 | Nature        | Normal Interp    |                  | I_f          |
 
| 9 | Relation      | Sign            | Normal Interp    | S : I_f      |
 
o---o---------------o------------------o------------------o---------------o
 
| A | Relation      | Sign            | Dynamical Object |              |
 
|  |              |                  | & Normal Interp  | S : O_d : I_f |
 
o---o---------------o------------------o------------------o---------------o
 
 
 
Just as I have always feared, this classification mania
 
appears to be communicable! But now I must definitely
 
review the Welby correspondence, as all this stuff was
 
a blur to my sensibilities the last 10 times I read it.
 
 
 
 
 
 
 
LOR.  Discussion Note 14
 
 
 
 
 
 
 
BM = Bernard Morand
 
 
 
[Table.  Ten Divisions of Signs (Peirce, Morand)]
 
 
 
BM: Yes this is clearer (in particular in expressing relations with :)
 
 
 
This is what Peirce used to form elementary relatives, for example,
 
o:s:i = <o, s, i>, and I find it utterly ubertous in a wide variety
 
of syntactic circumstances.
 
 
 
BM: I suggest making a correction to myself if
 
    the table is destinate to become canonic.
 
 
 
Hah!  Good one!
 
 
 
BM: I probably made a too quick jump from Normal Interpretant to Final Interpretant.
 
    As we know, the final interpretant, the ultimate one is not a sign for Peirce
 
    but a habit.  So for the sake of things to come it would be more careful to
 
    retain I_n in place of I_f for now.
 
 
 
This accords with my understanding of how the word is used in mathematics.
 
In my own work it has been necessary to distinguish many different species
 
of expressions along somewhat similar lines, for example:  arbitrary, basic,
 
canonical, decidable, normal, periodic, persistent, prototypical, recurrent,
 
representative, stable, typical, and so on.  So I will make the changes below:
 
 
 
Table.  Ten Divisions of Signs (Peirce, Morand)
 
o---o---------------o------------------o------------------o---------------o
 
|  | According To: | Of:              | To:              |              |
 
o===o===============o==================o==================o===============o
 
| 1 | Apprehension  | Sign Itself      |                  | S            |
 
| 2 | Presentation  | Immediate Object |                  | O_i          |
 
| 3 | Being        | Dynamical Object |                  | O_d          |
 
| 4 | Relation      | Sign            | Dynamical Object | S : O_d      |
 
o---o---------------o------------------o------------------o---------------o
 
| 5 | Presentation  | Immediate Interp |                  | I_i          |
 
| 6 | Being        | Dynamical Interp |                  | I_d          |
 
| 7 | Relation      | Sign            | Dynamical Interp | S : I_d      |
 
o---o---------------o------------------o------------------o---------------o
 
| 8 | Nature        | Normal Interp    |                  | I_n          |
 
| 9 | Relation      | Sign            | Normal Interp    | S : I_n      |
 
o---o---------------o------------------o------------------o---------------o
 
| A | Tri. Relation | Sign            | Dynamical Object |              |
 
|  |              |                  | & Normal Interp  | S : O_d : I_n |
 
o---o---------------o------------------o------------------o---------------o
 
 
 
BM: Peirce gives the following definition (CP 8.343):
 
 
 
BM, quoting CSP:
 
 
 
    | It is likewise requisite to distinguish
 
    | the 'Immediate Interpretant', i.e. the
 
    | Interpretant represented or signified in
 
    | the Sign, from the 'Dynamic Interpretant',
 
    | or effect actually produced on the mind
 
    | by the Sign;  and both of these from
 
    | the 'Normal Interpretant', or effect
 
    | that would be produced on the mind by
 
    | the Sign after sufficient development
 
    | of thought.
 
    |
 
    | C.S. Peirce, 'Collected Papers', CP 8.343.
 
 
 
Well, you've really tossed me in the middle of the briar patch now!
 
I must continue with my reading from the 1870 LOR, but now I have
 
to add to my do-list the problems of comparing the whole variorum
 
of letters and drafts of letters to Lady Welby.  I only have the
 
CP 8 and Wiener versions here, so I will depend on you for ample
 
excerpts from the Lieb volume.
 
 
 
 
 
 
 
LOR.  Discussion Note 15
 
 
 
 
 
 
 
I will need to go back and pick up the broader contexts of your quotes.
 
For ease of study I break Peirce's long paragraphs into smaller pieces.
 
 
 
| It seems to me that one of the first useful steps toward a science
 
| of 'semeiotic' ([Greek 'semeiootike']), or the cenoscopic science
 
| of signs, must be the accurate definition, or logical analysis,
 
| of the concepts of the science.
 
|
 
| I define a 'Sign' as anything which on the one hand
 
| is so determined by an Object and on the other hand
 
| so determines an idea in a person's mind, that this
 
| latter determination, which I term the 'Interpretant'
 
| of the sign, is thereby mediately determined by that
 
| Object.
 
|
 
| A sign, therefore, has a triadic relation to
 
| its Object and to its Interpretant.  But it is
 
| necessary to distinguish the 'Immediate Object',
 
| or the Object as the Sign represents it, from
 
| the 'Dynamical Object', or really efficient
 
| but not immediately present Object.
 
|
 
| It is likewise requisite to distinguish
 
| the 'Immediate Interpretant', i.e. the
 
| Interpretant represented or signified in
 
| the Sign, from the 'Dynamic Interpretant',
 
| or effect actually produced on the mind
 
| by the Sign;  and both of these from
 
| the 'Normal Interpretant', or effect
 
| that would be produced on the mind by
 
| the Sign after sufficient development
 
| of thought.
 
|
 
| On these considerations I base a recognition of ten respects in which Signs
 
| may be divided.  I do not say that these divisions are enough.  But since
 
| every one of them turns out to be a trichotomy, it follows that in order
 
| to decide what classes of signs result from them, I have 3^10, or 59049,
 
| difficult questions to carefully consider;  and therefore I will not
 
| undertake to carry my systematical division of signs any further,
 
| but will leave that for future explorers.
 
|
 
| C.S. Peirce, 'Collected Papers', CP 8.343.
 
 
 
You never know when the future explorer will be yourself.
 
 
 
 
 
 
 
LOR.  Discussion Note 16
 
 
 
 
 
 
 
Burks, the editor of CP 8, attaches this footnote
 
to CP 8.342-379, "On the Classification of Signs":
 
 
 
| From a partial draft of a letter to Lady Welby, bearing
 
| the dates of 24, 25, and 28 December 1908, Widener IB3a,
 
| with an added quotation in 368n23.  ...
 
 
 
There is a passage roughly comparable to CP 8.343 in a letter
 
to Lady Welby dated 23 December 1908, pages 397-409 in Wiener,
 
which is incidentally the notorious "sop to Cerberus" letter:
 
 
 
| It is usual and proper to distinguish two Objects of a Sign,
 
| the Mediate without, and the Immediate within the Sign.  Its
 
| Interpretant is all that the Sign conveys:  acquaintance with
 
| its Object must be gained by collateral experience.
 
|
 
| The Mediate Object is the Object outside of the Sign;  I call
 
| it the 'Dynamoid' Object.  The Sign must indicate it by a hint;
 
| and this hint, or its substance, is the 'Immediate' Object.
 
|
 
| Each of these two Objects may be said to be capable of either of
 
| the three Modalities, though in the case of the Immediate Object,
 
| this is not quite literally true.
 
|
 
| Accordingly, the Dynamoid Object may be a Possible;  when I term
 
| the Sign an 'Abstractive';  such as the word Beauty;  and it will be
 
| none the less an Abstractive if I speak of "the Beautiful", since it is
 
| the ultimate reference, and not the grammatical form, that makes the sign
 
| an 'Abstractive'.
 
|
 
| When the Dynamoid Object is an Occurrence (Existent thing or Actual fact
 
| of past or future), I term the Sign a 'Concretive';  any one barometer
 
| is an example;  and so is a written narrative of any series of events.
 
|
 
| For a 'Sign' whose Dynamoid Object is a Necessitant, I have at present
 
| no better designation than a 'Collective', which is not quite so bad a
 
| name as it sounds to be until one studies the matter:  but for a person,
 
| like me, who thinks in quite a different system of symbols to words, it
 
| is so awkward and often puzzling to translate one's thought into words!
 
|
 
| If the Immediate Object is a "Possible", that is, if the Dynamoid Object
 
| is indicated (always more or less vaguely) by means of its Qualities, etc.,
 
| I call the Sign a 'Descriptive';
 
|
 
| if the Immediate is an Occurrence, I call the Sign a 'Designative';
 
|
 
| and if the Immediate Object is a Necessitant, I call the Sign a
 
| 'Copulant';  for in that case the Object has to be so identified
 
| by the Interpreter that the Sign may represent a necessitation.
 
| My name is certainly a temporary expedient.
 
|
 
| It is evident that a possible can determine nothing but a Possible,
 
| it is equally so that a Necessitant can be determined by nothing but
 
| a Necessitant.  Hence it follows from the Definition of a Sign that
 
| since the Dynamoid Object determines the Immediate Object,
 
|
 
|    Which determines the Sign itself,
 
|    which determines the Destinate Interpretant
 
|    which determines the Effective Interpretant
 
|    which determines the Explicit Interpretant
 
|
 
| the six trichotomies, instead of determining 729 classes of signs,
 
| as they would if they were independent, only yield 28 classes;
 
| and if, as I strongly opine (not to say almost prove), there
 
| are four other trichotomies of signs of the same order of
 
| importance, instead of making 59,049 classes, these will
 
| only come to 66.
 
|
 
| The additional 4 trichotomies are undoubtedly, first:
 
|
 
|    Icons*,  Symbols,  Indices,
 
|
 
|*(or Simulacra, Aristotle's 'homoiomata'), caught from Plato, who I guess took it
 
| from the Mathematical school of logic, for it earliest appears in the 'Phaedrus'
 
| which marks the beginning of Plato's being decisively influenced by that school.
 
| Lutoslowski is right in saying that the 'Phaedrus' is later than the 'Republic'
 
| but his date 379 B.C. is about eight years too early.
 
|
 
| and then 3 referring to the Interpretants.  One of these I am pretty confident
 
| is into:  'Suggestives', 'Imperatives', 'Indicatives', where the Imperatives
 
| include the Interrogatives.  Of the other two I 'think' that one must be
 
| into Signs assuring their Interpretants by:
 
|
 
|    Instinct,  Experience,  Form.
 
|
 
| The other I suppose to be what, in my 'Monist'
 
| exposition of Existential Graphs, I called:
 
|
 
|    Semes,  Phemes,  Delomes.
 
|
 
| CSP, 'Selected Writings', pp. 406-408.
 
|
 
|'Charles S. Peirce:  Selected Writings (Values in a Universe of Chance)',
 
| edited with an introduction and notes by Philip P. Wiener, Dover,
 
| New York, NY, 1966.  Originally published under the subtitle
 
| in parentheses above, Doubleday & Company, 1958.
 
 
 
But see CP 4.549-550 for a significant distinction between
 
the categories (or modalities) and the orders of intention.
 
 
 
 
 
 
 
LOR.  Discussion Note 17
 
 
 
 
 
 
 
HC = Howard Callaway
 
JA = Jon Awbrey
 
 
 
JA: In closing, observe that the teridentity relation has turned up again
 
    in this context, as the second comma-ing of the universal term itself:
 
 
 
    1,, = B:B:B +, C:C:C +, D:D:D +, E:E:E +, I:I:I +, J:J:J +, O:O:O.
 
 
 
HC: I see that you've come around to a mention of teridentity again, Jon.
 
    Still, if I recall the prior discussions, then no one doubts that we
 
    can have a system of notation in which teridentity appears (I don't
 
    actually see it here).
 
 
 
Perhaps we could get at the root of the misunderstanding
 
if you tell me why you don't actually see the concept of
 
teridentity being exemplified here.
 
 
 
If it's only a matter of having lost the context of the
 
present discussion over the break, then you may find the
 
previous notes archived at the distal ends of the ur-links
 
that I append below (except for the first nine discussion
 
notes that got lost in a disk crash at the Arisbe Dev site).
 
 
 
HC: Also, I think we can have a system of notation in which
 
    teridentity is needed.  Those points seem reasonably clear.
 
 
 
The advantage of a concept is the integration of a species of manifold.
 
The necessity of a concept is the incapacity to integrate it otherwise.
 
 
 
Of course, no one should be too impressed with a concept that
 
is only the artifact of a particular system of representation.
 
So before we accord a concept the status of addressing reality,
 
and declare it a term of some tenured office in our intellects,
 
we would want to see some evidence that it helps us to manage
 
a reality that we cannot see a way to manage any other way.
 
 
 
Granted.
 
 
 
Now how in general do we go about an investiture of this sort?
 
That is the big question that would serve us well to consider
 
in the process of the more limited investigation of identity.
 
Indeed, I do not see how it is possible to answer the small
 
question if no understanding is reached on the big question.
 
 
 
HC: What remains relatively unclear is why we should need a system of notation
 
    in which teridentity appears or is needed as against one in which it seems
 
    not to be needed -- since assertion of identity can be made for any number
 
    of terms in the standard predicate calculus.
 
 
 
This sort of statement totally non-plusses me.
 
It seems like a complete non-sequitur or even
 
a contradiction in terms to me.
 
 
 
The question is about the minimal adequate resource base for
 
defining, deriving, or generating all of the concepts that we
 
need for a given but very general type of application that we
 
conventionally but equivocally refer to as "logic".  You seem
 
to be saying something like this:  We don't need 3-identity
 
because we have 4-identity, 5-identity, 6-identity, ..., in
 
the "standard predicate calculus".  The question is not what
 
concepts are generated in all the generations that follow the
 
establishment of the conceptual resource base (axiom system),
 
but what is the minimal set of concepts that we can use to
 
generate the needed collection of concepts.  And there the
 
answer is, in a way that is subject to the usual sorts of
 
mathematical proof, that 3-identity is the minimum while
 
2-identity is not big enough to do the job we want to do.
 
 
 
Logic Of Relatives 01-41, LOR Discussion Notes 10-17.
 
 
 
 
 
 
 
LOR.  Discussion Note 18
 
 
 
 
 
 
 
BM = Bernard Morand
 
JA = Jon Awbrey
 
 
 
JA: but now I have to add to my do-list the problems of comparing the
 
    whole variorum of letters and drafts of letters to Lady Welby.
 
    I only have the CP 8 and Wiener versions here, so I will
 
    depend on you for ample excerpts from the Lieb volume.
 
 
 
BM: I made such a kind of comparison some time ago.  I selected
 
    the following 3 cases on the criterium of alternate "grounds".
 
    Hoping it could save some labor.  The first rank expressions
 
    come from the MS 339 written in Oct. 1904 and I label them
 
    with an (a).  I think that it is interesting to note that
 
    they were written four years before the letters to Welby
 
    and just one or two years after the Syllabus which is the
 
    usual reference for the classification in 3 trichotomies
 
    and 10 classes.  The second (b) is our initial table (from
 
    a draft to Lady Welby, Dec. 1908, CP 8.344) and the third
 
    (c) comes from a letter sent in Dec. 1908 (CP 8.345-8.376).
 
    A tabular presentation would be better but I can't do it.
 
    Comparing (c) against (a) and (b) is informative, I think.
 
 
 
Is this anywhere that it can be linked to from Arisbe?
 
I've seen many pretty pictures of these things over the
 
years, but may have to follow my own gnosis for a while.
 
 
 
Pages I have bookmarked just recently,
 
but not really had the chance to study:
 
 
 
http://www.digitalpeirce.org/hoffmann/p-sighof.htm
 
http://www.csd.uwo.ca/~merkle/thesis/Introduction.html
 
http://members.door.net/arisbe/menu/library/aboutcsp/merkle/hci-abstract.htm
 
 
 
 
 
 
 
LOR.  Discussion Note 19
 
 
 
 
 
 
 
BM = Bernard Morand
 
JA = Jon Awbrey
 
 
 
I now have three partially answered messages on the table,
 
so I will just grab this fragment off the top of the deck.
 
 
 
BM: Peirce gives the following definition (CP 8.343):
 
 
 
BM, quoting CSP:
 
 
 
    | It is likewise requisite to distinguish
 
    | the 'Immediate Interpretant', i.e. the
 
    | Interpretant represented or signified in
 
    | the Sign, from the 'Dynamic Interpretant',
 
    | or effect actually produced on the mind
 
    | by the Sign; and both of these from
 
    | the 'Normal Interpretant', or effect
 
    | that would be produced on the mind by
 
    | the Sign after sufficient development
 
    | of thought.
 
    |
 
    | C.S. Peirce, 'Collected Papers', CP 8.343.
 
 
 
JA: Well, you've really tossed me in the middle of the briar patch now!
 
    I must continue with my reading from the 1870 LOR, ...
 
 
 
BM: Yes indeed!  I am irritated by having not the necessary
 
    turn of mind to fully grasp it.  But it seems to be a
 
    prerequisite in order to understand the very meaning
 
    of the above table.  It could be the same for:
 
 
 
BM, quoting CSP:
 
 
 
    | I define a 'Sign' as anything which on the one hand
 
    | is so determined by an Object and on the other hand
 
    | so determines an idea in a person's mind, that this
 
    | latter determination, which I term the 'Interpretant'
 
    | of the sign, is thereby mediately determined by that
 
    | Object.
 
 
 
BM: The so-called "latter determination" would make the 'Interpretant'
 
    a tri-relative term into a teridentity involving Sign and Object.
 
    Isn't it?
 
 
 
BM: I thought previously that the Peirce's phrasing was just applying the
 
    principle of transitivity.  From O determines S and S determines I,
 
    it follows:  O determines I.  But this is not the same as teridentity.
 
    Do you think so or otherwise?
 
 
 
My answers are "No" and "Otherwise".
 
 
 
Continuing to discourse about definite universes thereof,
 
the 3-identity term over the universe 1 = {A, B, C, D, ...} --
 
I only said it was definite, I didn't say it wasn't vague! --
 
designates, roughly speaking, the 3-adic relation that may
 
be hinted at by way of the following series:
 
 
 
1,,  =  A:A:A +, B:B:B +, C:C:C +, D:D:D +, ...
 
 
 
I did a study on Peirce's notion of "determination".
 
As I understand it so far, we need to keep in mind
 
that it is more fundamental than causation, can be
 
a form of "partial determination", and is roughly
 
formal, mathematical, or "information-theoretic",
 
not of necessity invoking any temporal order.
 
 
 
For example, when we say "The points A and B determine the line AB",
 
this invokes the concept of a 3-adic relation of determination that
 
does not identify A, B, AB, is not transitive, as transitivity has
 
to do with the composition of 2-adic relations and would amount to
 
the consideration of a degenerate 3-adic relation in this context.
 
 
 
Now, it is possible to have a sign relation q whose sum enlists
 
an elementary sign relation O:S:I where O = S = I.  For example,
 
it makes perfect sense to me to say that the whole universe may
 
be a sign of itself to itself, so the conception is admissable.
 
But this amounts to a very special case, by no means general.
 
More generally, we are contemplating sums like the following:
 
 
 
q  =  O1:S1:I1 +, O2:S2:I2 +, O3:S3:I3 +, ...
 
 
 
 
 
 
 
LOR.  Discussion Note 20
 
 
 
 
 
 
 
HC = Howard Callaway
 
JR = Joe Ransdell
 
 
 
HC: Though I certainly hesitate to think that we are separated
 
    from the world by a veil of signs, it seems clear, too, on
 
    Peircean grounds, that no sign can ever capture its object
 
    completely.
 
 
 
JR: Any case of self-representation is a case of sign-object identity,
 
    in some sense of "identity".  I have argued in various places that
 
    this is the key to the doctrine of immediate perception as it occurs
 
    in Peirce's theory.
 
 
 
To put the phrase back on the lathe:
 
 
 
| We are not separated from the world by a veil of signs --
 
| we are the veil of signs.
 
 
 
 
 
 
 
LOR.  Discussion Note 21
 
 
 
 
 
 
 
AS = Armando Sercovich
 
 
 
AS: We are not separated from the world by a veil of signs nor we are a veil of signs.
 
    Simply we are signs.
 
 
 
AS, quoting CSP:
 
 
 
    | The *man-sign* acquires information, and comes to mean more than he did before.
 
    | But so do words.  Does not electricity mean more now than it did in the days
 
    | of Franklin?  Man makes the word, and the word means nothing which the man
 
    | has not made it mean, and that only to some man.  But since man can think
 
    | only by means of words or other external symbols, these might turn round
 
    | and say:  "You mean nothing which we have not taught you, and then only
 
    | so far as you address some word as the interpretant of your thought".
 
    | In fact, therefore, men and words reciprocally educate each other;
 
    | each increase of a man's information involves, and is involved by,
 
    | a corresponding increase of a word's information.
 
    |
 
    | Without fatiguing the reader by stretching this parallelism too far, it is
 
    | sufficient to say that there is no element whatever of man's consciousness
 
    | which has not something corresponding to it in the word;  and the reason is
 
    | obvious.  It is that the word or sign which man uses *is* the man itself.
 
    | For, as the fact that every thought is a sign, taken in conjunction with
 
    | the fact that life is a train of thought, proves that man is a sign;  so,
 
    | that every thought is an *external* sign proves that man is an external
 
    | sign.  That is to say, the man and the external sign are identical, in
 
    | the same sense in which the words 'homo' and 'man' are identical.  Thus
 
    | my language is the sum total of myself;  for the man is the thought ...
 
    |
 
    |'Charles S. Peirce:  Selected Writings (Values in a Universe of Chance)',
 
    | edited with an introduction and notes by Philip P. Wiener, Dover,
 
    | New York, NY, 1966. Originally published under the subtitle
 
    | in parentheses above, Doubleday & Company, 1958.
 
 
 
I read you loud and clear.
 
Every manifold must have
 
its catalytic converter.
 
 
 
<Innumerate Continuation:>
 
 
 
TUC = The Usual CISPEC
 
 
 
TUC Alert:
 
 
 
| E.P.A. Says Catalytic Converter Is
 
| Growing Cause of Global Warming
 
| By Matthew L. Wald
 
| Copyright 1998 The New York Times
 
| May 29, 1998
 
| -----------------------------------------------------------------------
 
| WASHINGTON -- The catalytic converter, an invention that has sharply
 
| reduced smog from cars, has now become a significant and growing cause
 
| of global warming, according to the Environmental Protection Agency
 
 
 
Much as I would like to speculate ad libitum on these exciting new prospects for the
 
application of Peirce's chemico-algebraic theory of logic to the theorem-o-dynamics
 
of auto-semeiosis, I must get back to "business as usual" (BAU) ...
 
 
 
And now a word from our sponsor ...
 
 
 
http://www2.naias.com/
 
 
 
Reporting from Motown ---
 
 
 
Jon Awbrey
 
 
 
 
 
 
 
LOR.  Discussion Note 22
 
 
 
 
 
 
 
HC = Howard Callaway
 
 
 
HC: You quote the following passage from a prior posting of mine:
 
 
 
HC: What remains relatively unclear is why we should need a system of notation
 
    in which teridentity appears or is needed as against one in which it seems
 
    not to be needed -- since assertion of identity can be made for any number
 
    of terms in the standard predicate calculus.
 
 
 
HC: You comment as follows:
 
 
 
JA: This sort of statement totally non-plusses me.
 
    It seems like a complete non-sequitur or even
 
    a contradiction in terms to me.
 
 
 
JA: The question is about the minimal adequate resource base for
 
    defining, deriving, or generating all of the concepts that we
 
    need for a given but very general type of application that we
 
    conventionally but equivocally refer to as "logic".  You seem
 
    to be saying something like this:  We don't need 3-identity
 
    because we have 4-identity, 5-identity, 6-identity, ..., in
 
    the "standard predicate calculus".  The question is not what
 
    concepts are generated in all the generations that follow the
 
    establishment of the conceptual resource base (axiom system),
 
    but what is the minimal set of concepts that we can use to
 
    generate the needed collection of concepts.  And there the
 
    answer is, in a way that is subject to the usual sorts of
 
    mathematical proof, that 3-identity is the minimum while
 
    2-identity is not big enough to do the job we want to do.
 
 
 
HC: I have fallen a bit behind on this thread while attending to some other
 
    matters, but in this reply, you do seem to me to be coming around to an
 
    understanding of the issues involved, as I see them.  You put the matter
 
    this way, "We don't need 3-identity because we have 4-identity, 5-identity,
 
    6-identity, ..., in the 'standard predicate calculus'".  Actually, as I think
 
    you must know, there is no such thing as "4-identity", "5-identity", etc., in
 
    the standard predicate calculus.  It is more that such concepts are not needed,
 
    just as teridentity is not needed, since the general apparatus of the predicate
 
    calculus allows us to express identity among any number of terms without special
 
    provision beyond "=".
 
 
 
No, that is not the case.  Standard predicate calculus allows the expression
 
of predicates I_k, for k = 2, 3, 4, ..., such that I_k (x_1, ..., x_k) holds
 
if and only if all x_j, for j = 1 to k, are identical.  So predicate calculus
 
contains a k-identity predicate for all such k.  So whether "they're in there"
 
is not an issue.  The question is whether these or any other predicates can be
 
constructed or defined in terms of 2-adic relations alone.  And the answer is
 
no, they cannot.  The vector of the misconception counterwise appears to be
 
as various a virus as the common cold, and every bit as resistant to cure.
 
I have taken the trouble to enumerate some of the more prevalent strains,
 
but most of them appear to go back to the 'Principia Mathematica', and
 
the variety of nominalism called "syntacticism" -- Ges-und-heit! --
 
that was spread by it, however unwittedly by some of its carriers.
 
 
 
 
 
 
 
LOR.  Discussion Note 23
 
 
 
 
 
 
 
In trying to answer the rest of your last note,
 
it seems that we cannot go any further without
 
achieving some concrete clarity as to what is
 
denominated by "standard predicate calculus",
 
that is, "first order logic", or whatever.
 
 
 
There is a "canonical" presentation of the subject, as I remember it, anyway,
 
in the following sample of materials from Chang & Keisler's 'Model Theory'.
 
(There's a newer edition of the book, but this part of the subject hasn't
 
really changed all that much in ages.)
 
 
 
Model Theory 01-39
 
 
 
 
 
 
 
LOR.  Discussion Note 24
 
 
 
 
 
 
 
HC = Howard Callaway
 
 
 
HC: I might object that "teridentity" seems to come
 
    to a matter of "a=b & b=c", so that a specific
 
    predicate of teridentity seems unnecessary.
 
 
 
I am presently concerned with expositing and interpreting
 
the logical system that Peirce laid out in the LOR of 1870.
 
It is my considered opinion after thirty years of study that
 
there are untapped resources remaining in this work that have
 
yet to make it through the filters of that ilk of syntacticism
 
that was all the rage in the late great 1900's.  I find there
 
to be an appreciably different point of view on logic that is
 
embodied in Peirce's work, and until we have made the minimal
 
effort to read what he wrote it is just plain futile to keep
 
on pretending that we have already assimilated it, or that
 
we are qualified to evaluate its cogency.
 
 
 
The symbol "&" that you employ above denotes a mathematical object that
 
qualifies as a 3-adic relation.  Independently of my own views, there
 
is an abundance of statements in evidence that mathematical thinkers
 
from Peirce to Goedel consider the appreciation of facts like this
 
to mark the boundary between realism and nominalism in regard to
 
mathematical objects.
 
 
 
 
 
 
 
LOR.  Discussion Note 25
 
 
 
 
 
 
 
HC = Howard Callaway
 
JA = Jon Awbrey
 
 
 
HC: I might object that "teridentity" seems to come
 
    to a matter of "a=b & b=c", so that a specific
 
    predicate of teridentity seems unnecessary.
 
 
 
JA: I am presently concerned with expositing and interpreting
 
    the logical system that Peirce laid out in the LOR of 1870.
 
    It is my considered opinion after thirty years of study that
 
    there are untapped resources remaining in this work that have
 
    yet to make it through the filters of that ilk of syntacticism
 
    that was all the rage in the late great 1900's.  I find there
 
    to be an appreciably different point of view on logic that is
 
    embodied in Peirce's work, and until we have made the minimal
 
    effort to read what he wrote it is just plain futile to keep
 
    on pretending that we have already assimilated it, or that
 
    we are qualified to evaluate its cogency.
 
 
 
JA: The symbol "&" that you employ above denotes a mathematical object that
 
    qualifies as a 3-adic relation.  Independently of my own views, there
 
    is an abundance of statements in evidence that mathematical thinkers
 
    from Peirce to Goedel consider the appreciation of facts like this
 
    to mark the boundary between realism and nominalism in regard to
 
    mathematical objects.
 
 
 
HC: I would agree, I think, that "&" may be thought of
 
    as a function mapping pairs of statements onto the
 
    conjunction of that pair.
 
 
 
Yes, indeed, in the immortal words of my very first college algebra book:
 
"A binary operation is a ternary relation".  As it happens, the symbol "&"
 
is equivocal in its interpretation -- computerese today steals a Freudian
 
line and dubs it "polymorphous" -- it can be regarded in various contexts
 
as a 3-adic relation on syntactic elements called "sentences", on logical
 
elements called "propositions", or on truth values collated in the boolean
 
domain B = {false, true} = {0, 1}.  But the mappings and relations between
 
all of these interpretive choices are moderately well understood.  Still,
 
no matter how many ways you enumerate for looking at a B-bird, the "&" is
 
always 3-adic.  And that is sufficient to meet your objection, so I think
 
I will just leave it there until next time.
 
 
 
On a related note, that I must postpone until later:
 
We seem to congrue that there is a skewness between
 
the way that most mathematicians use logic and some
 
philosophers talk about logic, but I may not be the
 
one to set it adjoint, much as I am inclined to try.
 
At the moment I have this long-post-poned exponency
 
to carry out.  I will simply recommend for your due
 
consideration Peirce's 1870 Logic Of Relatives, and
 
leave it at that.  There's a cornucopiousness to it
 
that's yet to be dreamt of in the philosophy of the
 
1900's.  I am doing what I can to infotain you with
 
the Gardens of Mathematical Recreations that I find
 
within Peirce's work, and that's in direct response
 
to many, okay, a couple of requests.  Perhaps I can
 
not hope to attain the degree of horticultural arts
 
that Gardners before me have exhibited in this work,
 
but then again, who could?  Everybody's a critic --
 
but the better ones read first, and criticize later.
 
 
 
 
 
 
 
LOR.  Discussion Note 26
 
 
 
 
 
 
 
HC = Howard Callaway
 
 
 
HC: But on the other hand, it is not customary to think of "&" as
 
    a relation among statements or sentences -- as, for instance,
 
    logical implication is considered a logical relation between
 
    statements or sentences.
 
 
 
Actually, it is the custom in many quarters to treat all of the
 
boolean operations, logical connectives, propositional relations,
 
or whatever you want to call them, as "equal citizens", having each
 
their "functional" (f : B^k -> B) and their "relational" (L c B^(k+1))
 
interpretations and applications.  From this vantage, the interpretive
 
distinction that is commonly regarded as that between "assertion" and
 
mere "contemplation" is tantamount to a "pragmatic" difference between
 
computing the values of a function on a given domain of arguments and
 
computing the inverse of a function vis-a-vis a prospective true value.
 
This is the logical analogue of the way that our mathematical models
 
of reality have long been working, unsuspected and undisturbed by
 
most philosophers of science, I might add.  If only the logical
 
side of the ledger were to be developed rather more fully than
 
it is at present, we might wake one of these days to find our
 
logical accounts of reality, finally, at long last, after an
 
overweaningly longish adolescence, beginning to come of age.
 
 
 
 
 
 
 
LOR.  Discussion Note 27
 
 
 
 
 
 
 
HC = Howard Callaway
 
 
 
HC: For, if I make an assertion A&B, then I am not asserting
 
    that the statement A stands in a relation to a statement B.
 
    Instead, I am asserting the conjunction A&B (which logically
 
    implies both the conjuncts in view of the definition of "&").
 
 
 
Please try to remember where we came in.  This whole play of
 
animadversions about 3-adicity and 3-identity is set against
 
the backdrop of a single point, over the issue as to whether
 
3-adic relations are wholly dispensable or somehow essential
 
to logic, mathematics, and indeed to argument, communication,
 
and reasoning in general.  Some folks clamor "Off with their
 
unnecessary heads!" -- other people, who are forced by their
 
occupations to pay close attention to the ongoing complexity
 
of the processes at stake, know that, far from finding 3-ads
 
in this or that isolated corner of the realm, one can hardly
 
do anything at all in the ways of logging or mathing without
 
running smack dab into veritable hosts of them.
 
 
 
I have just shown that "a=b & b=c" involves a 3-adic relation.
 
Some people would consider this particular 3-adic relation to
 
be more complex than the 3-identity relation, but that may be
 
a question of taste.  At any rate, the 3-adic aspect persists.
 
 
 
HC: If "&" counts as a triadic relation, simply because it serves
 
    to conjoin two statements into a third, then it would seem that
 
    any binary relation 'R' will count as triadic, simply because
 
    it places two things into a relation, which is a "third" thing.
 
    By the same kind of reasoning a triadic relation, as ordinarily
 
    understood would be really 4-adic.
 
 
 
The rest of your comments are just confused,
 
and do not use the terms as they are defined.
 
 
 
 
 
 
 
LOR.  Discussion Note 28
 
 
 
 
 
 
 
JA = Jon Awbrey
 
JR = Joseph Ransdell
 
 
 
JA: Notice that Peirce follows the mathematician's usual practice,
 
    then and now, of making the status of being an "individual" or
 
    a "universal" relative to a discourse in progress.  I have come
 
    to appreciate more and more of late how radically different this
 
    "patchwork" or "piecewise" approach to things is from the way of
 
    some philosophers who seem to be content with nothing less than
 
    many worlds domination, which means that they are never content
 
    and rarely get started toward the solution of any real problem.
 
    Just my observation, I hope you understand.
 
 
 
JR: Yes, I take this as underscoring and explicating the import of
 
    making logic prior to rather than dependent upon metaphysics.
 
 
 
I think that Peirce, and of course many math folks, would take math
 
as prior, on a par, or even identical with logic.  Myself I've been
 
of many minds about this over the years.  The succinctest picture
 
that I get from Peirce is always this one:
 
 
 
| [Riddle of the Sphynx]
 
|
 
| Normative science rests largely on phenomenology and on mathematics;
 
| Metaphysics on phenomenology and on normative science.
 
|
 
| C.S. Peirce, CP 1.186 (1903)
 
|
 
|
 
|                          o Metaphysics
 
|                        /|
 
|                        / |
 
|                      /  |
 
|    Normative Science o  |
 
|                    / \  |
 
|                    /  \ |
 
|                  /    \|
 
|      Mathematics o      o Phenomenology
 
|
 
|
 
| ROTS.  http://stderr.org/pipermail/inquiry/2004-March/001262.html
 
 
 
Logic being a normative science must depend on math and phenomenology.
 
 
 
Of course, it all depends on what a person means by "logic" ...
 
 
 
JA: I also observe that Peirce takes the individual objects of
 
    a particular universe of discourse in a "generative" way,
 
    not a "totalizing" way, and thus they afford us with the
 
    basis for talking freely about collections, constructions,
 
    properties, qualities, subsets, and "higher types", as
 
    the phrase is mint.
 
 
 
JR: Would this be essentially the same as regarding quantification as
 
    distributive rather than collective, i.e. we take the individuals
 
    of a class one-by-one as selectable rather than as somehow given
 
    all at once, collectively?
 
 
 
Gosh, that's a harder question.  Your suggestion reminds me
 
of the way that some intuitionist and even some finitist
 
mathematicians talk when they reflect on math practice.
 
I have leanings that way, but when I have tried to
 
give up the classical logic axioms, I have found
 
them too built in to my way of thinking to quit.
 
Still, a healthy circumspection about about our
 
often-wrongly vaunted capacties to conceive of
 
totalities is a habitual part of current math.
 
Again, I think individuals are made not born,
 
that is, to some degree factitious and mere
 
compromises of this or that conveniency.
 
This is one of the reasons that I have
 
been trying to work out the details
 
of a functional approach to logic,
 
propostional, quantificational,
 
and relational.
 
 
 
Cf: INTRO 30.  http://stderr.org/pipermail/inquiry/2004-November/001765.html
 
In: INTRO.  http://stderr.org/pipermail/inquiry/2004-November/thread.html#1720
 
 
 
 
 
 
 
LOR.  Discussion Note 29
 
 
 
 
 
 
 
JA = Jon Awbrey
 
GR = Gary Richmond
 
 
 
Re: LOR.COM 11.24.  http://stderr.org/pipermail/inquiry/2004-November/001836.html
 
In: LOR.COM.        http://stderr.org/pipermail/inquiry/2004-November/thread.html#1755
 
 
 
JA: The manner in which these arrows and qualified arrows help us
 
    to construct a suspension bridge that unifies logic, semiotics,
 
    statistics, stochastics, and information theory will be one of
 
    the main themes that I aim to elaborate throughout the rest of
 
    this inquiry.
 
 
 
GR: Pretty ambitious, Jon.  I'm sure you're up to it.
 
 
 
GR: I'd like to anticipate 3 versions:  The mathematical (cactus diagrams, etc.),
 
    the poetic, and the commonsensical -- ordinary language for those who are
 
    NEITHER logicians NOR poets.
 
 
 
GR: Are you up to THAT?
 
 
 
Riddle A Body:  "Time Enough, And Space, Excalibrate Co-Arthurs Should Apply"
 
 
 
 
 
 
 
LOR.  Discussion Note 30
 
 
 
 
 
 
 
JA = Jon Awbrey
 
GR = Gary Richmond
 
 
 
Re: LOR.DIS 29.  http://stderr.org/pipermail/inquiry/2004-November/001838.html
 
In: LOR.DIS.    http://stderr.org/pipermail/inquiry/2004-November/thread.html#1768
 
 
 
JA: Riddle A Body:  "Time Enough, And Space, Excalibrate Co-Arthurs Should Apply"
 
 
 
GR: Well said, and truly!
 
 
 
Body A Riddle:  TEASE CASA = Fun House.
 
 
 
 
 
 
 
LOR.  Discussion Note 31
 
 
 
 
 
 
 
Many illusions of selective reading -- like the myth that Peirce did not
 
discover quantification over indices until 1885 -- can be dispelled by
 
looking into his 1870 "Logic of Relatives".  I started a web study of
 
this in 2002, reworked again in 2003 and 2004, the current version
 
of which can be found here:
 
 
 
LOR.      http://stderr.org/pipermail/inquiry/2004-November/thread.html#1750
 
LOR-COM.  http://stderr.org/pipermail/inquiry/2004-November/thread.html#1755
 
LOR-DIS.  http://stderr.org/pipermail/inquiry/2004-November/thread.html#1768
 
 
 
I've only gotten as far as the bare infrastructure of Peirce's 1870 LOR,
 
but an interesting feature of the study is that, if one draws the pictures
 
that seem almost demanded by his way of linking up indices over expressions,
 
then one can see a prototype of his much later logical graphs developing in
 
the text.
 
 
 
 
 
 
 
LOR.  Discussion Note 32
 
 
 
 
 
 
 
 
 
 
 
 
 
 
 
LOR.  Work 1
 
 
 
 
 
 
 
BM: Several discussions could take place there,
 
    as to the reasons for the number of divisions,
 
    the reasons of the titles themselves.  Another
 
    one is my translation from "normal interpretant"
 
    into "final interpretant" (which one is called
 
    elsewhere "Eventual Interpretant" or "Destinate
 
    Interpretant" by CSP).  I let all this aside
 
    to focus on the following remark:
 
 
 
BM: 6 divisions correspond to individual correlates:
 
 
 
    (S, O_i, O_d, I_i, I_d, I_n),
 
 
 
    3 divisions correspond to dyads:
 
 
 
    (S : O_d, S : I_d, S : I_n),
 
 
 
    and the tenth to a triad:
 
 
 
    (S : O_d : I_n).
 
 
 
    This remark would itself deserve
 
    a lot of explanations but one
 
    more time I let this aside.
 
 
 
BM: Then we have the following very clear statement from Peirce:
 
 
 
  | It follows from the Definition of a Sign
 
  | that since the Dynamoid Object determines
 
  | the Immediate Object,
 
  | which determines the Sign,
 
  | which determines the Destinate Interpretant
 
  | which determines the Effective Interpretant
 
  | which determines the Explicit Interpretant
 
  |
 
  | the six trichotomies, instead of determining 729 classes of signs,
 
  | as they would if they were independent, only yield 28 classes; and
 
  | if, as I strongly opine (not to say almost prove) there are four other
 
  | trichotomies of signs of the same order of importance, instead of making
 
  | 59049 classes, these will only come to 66.
 
  |
 
  | CSP, "Letter to Lady Welby", 14 Dec 1908, LW, p. 84.
 
 
 
BM: The separation made by CSP between 6 divisions and four others
 
    seems to rely upon the suggested difference between individual
 
    correlates and relations.  We get the idea that the 10 divisions
 
    are ordered on the whole and will end into 66 classes (by means of
 
    three ordered modal values on each division:  maybe, canbe, wouldbe).
 
    Finally we have too the ordering for the divisions relative to the
 
    correlates that I write in my notation:
 
 
 
    Od -> Oi -> S -> If -> Id -> Ii.
 
 
 
BM: This order of "determinations" has bothered many people
 
    but if we think of it as operative in semiosis, it seems
 
    to be correct (at least to my eyes).  Thus the question is:
 
    where, how, and why the "four other trichotomies" fit in this
 
    schema to obtain a linear ordering on the whole 10 divisions?
 
    May be the question can be rephrased as:  how intensional
 
    relationships fit into an extensional one?  Possibly the
 
    question could be asked the other way.  R. Marty responds
 
    that in a certain sense the four trichotomies give nothing
 
    more than the previous six ones but I strongly doubt of this.
 
 
 
BM: I put the problem in graphical form in an attached file
 
    because my message editor will probably make some mistakes.
 
    I make a distinction between arrow types drawing because I am
 
    not sure that the sequence of correlates determinations is of
 
    the same nature than correlates determination inside relations.
 
 
 
BM: It looks as if the problem amounts to some kind of projection
 
    of relations on the horizontal axis made of correlates.
 
 
 
BM: If we consider some kind of equivalence (and this seems necessary to
 
    obtain a linear ordering), by means of Agent -> Patient reductions on
 
    relations, then erasing transitive determinations leads to:
 
 
 
    Od -> Oi -> S -> S-Od -> If -> S-If -> S-Od-If -> Id -> S-Id -> Ii
 
 
 
BM: While it is interesting to compare the subsequence
 
    S-Od -> If -> S-If -> S-Od-If with the pragmatic maxim,
 
    I have no clear idea of the (in-) validity of such a result.
 
    But I am convinced that the clarity has to come from the
 
    Logic Of Relatives.
 
 
 
BM: I will be very grateful if you can make something with all that stuff.
 
 
 
 
 
 
 
LOR.  Work 2
 
 
 
 
 
 
 
BM: I also found this passage which may be of some interest
 
    (CP 4.540, Prolegomena to an Apology of Pragmatism):
 
 
 
| But though an Interpretant is not necessarily a Conclusion, yet a
 
| Conclusion is necessarily an Interpretant. So that if an Interpretant is
 
| not subject to the rules of Conclusions there is nothing monstrous in my
 
| thinking it is subject to some generalization of such rules. For any
 
| evolution of thought, whether it leads to a Conclusion or not, there is a
 
| certain normal course, which is to be determined by considerations not in
 
| the least psychological, and which I wish to expound in my next
 
| article;†1 and while I entirely agree, in opposition to distinguished
 
| logicians, that normality can be no criterion for what I call
 
| rationalistic reasoning, such as alone is admissible in science, yet it
 
| is precisely the criterion of instinctive or common-sense reasoning,
 
| which, within its own field, is much more trustworthy than rationalistic
 
| reasoning. In my opinion, it is self-control which makes any other than
 
| the normal course of thought possible, just as nothing else makes any
 
| other than the normal course of action possible; and just as it is
 
| precisely that that gives room for an ought-to-be of conduct, I mean
 
| Morality, so it equally gives room for an ought-to-be of thought, which
 
| is Right Reason; and where there is no self-control, nothing but the
 
| normal is possible. If your reflections have led you to a different
 
| conclusion from mine, I can still hope that when you come to read my next
 
| article, in which I shall endeavor to show what the forms of thought are,
 
| in general and in some detail, you may yet find that I have not missed
 
| the truth.
 
 
 
JA: Just as I have always feared, this classification mania
 
    appears to be communicable! But now I must definitely
 
    review the Welby correspondence, as all this stuff was
 
    a blur to my sensibilities the last 10 times I read it.
 
 
 
BM: I think that I understand your reticence. I wonder if:
 
 
 
    a.  the fact that the letters to Lady Welby have been published as such,
 
        has not lead to approach the matter in a certain way.
 
 
 
    b.  other sources, eventually unpublished, would give another lighting on
 
        the subject, namely a logical one. I think of MS 339 for example that
 
        seems to be part of the Logic Notebook. I have had access to some pages
 
        of it, but not to the whole MS.
 
 
 
BM: A last remark. I don't think that classification is a mania for CSP but I
 
    know that you know that! It is an instrument of thought and I think that
 
    it is in this case much more a plan for experimenting than the exposition
 
    of a conclusion. Experimenting what ? There is a strange statement in a
 
    letter to W. James where CSP says that what is in question in his "second
 
    way of dividing signs" is the logical theory of numbers. I give this from
 
    memory. I have not the quote at hand now but I will search for it if needed.
 
 
 
 
 
 
 
LOR.  Work 3
 
 
 
 
 
 
 
BM = Bernard Morand
 
JA = Jon Awbrey
 
 
 
JA: ... but now I have to add to my do-list the problems of comparing
 
    the whole variorum of letters and drafts of letters to Lady Welby.
 
    I only have the CP 8 and Wiener versions here, so I will depend
 
    on you for ample excerpts from the Lieb volume.
 
 
 
BM: I made such a kind of comparison some time ago. I selected the following
 
    3 cases on the criterium of alternate "grounds". Hoping it could save
 
    some labor. The first rank expressions come from the MS 339 written in
 
    Oct. 1904 and I label them with an (a). I think that it is interesting to
 
    note that they were written four years before the letters to Welby and
 
    just one or two years after the Syllabus which is the usual reference for
 
    the classification in 3 trichotomies and 10 classes. The second (b) is
 
    our initial table (from a draft to Lady Welby, Dec. 1908, CP 8.344) and
 
    the third (c) comes from a letter sent in Dec. 1908 (CP 8.345-8.376). A
 
    tabular presentation would be better but I can't do it. Comparing (c)
 
    against (a) and (b) is informative, I think.
 
 
 
Division 1
 
 
 
(a) According to the matter of the Sign
 
 
 
(b) According to the Mode of Apprehension of the Sign itself
 
 
 
(c) Signs in respect to their Modes of possible Presentation
 
 
 
Division 2
 
 
 
(a) According to the Immediate Object
 
 
 
(b) According to the Mode of Presentation of the Immediate Object
 
 
 
(c) Objects, as they may be presented
 
 
 
Division 3
 
 
 
(a) According to the Matter of the Dynamic Object
 
 
 
(b) According to the Mode of Being of the Dynamical Object
 
 
 
(c) In respect to the Nature of the Dynamical Objects of Signs
 
 
 
Division 4
 
 
 
(a) According to the mode of representing object by the Dynamic Object
 
 
 
(b) According to the Relation of the Sign to its Dynamical Object
 
 
 
(c) The fourth Trichotomy
 
 
 
Division 5
 
 
 
(a) According to the Immédiate Interpretant
 
 
 
(b) According to the Mode of Presentation of the Immediate Interpretant
 
 
 
(c) As to the nature of the Immediate (or Felt ?) Interpretant
 
 
 
Division 6
 
 
 
(a) According to the Matter of Dynamic Interpretant
 
 
 
(b) According to the Mode of Being of the Dynamical Interpretant
 
 
 
(c) As to the Nature of the Dynamical Interpretant
 
 
 
Division 7
 
 
 
(a) According to the Mode of Affecting Dynamic Interpretant
 
 
 
(b) According to the relation of the Sign to the Dynamical Interpretant
 
 
 
(c) As to the Manner of Appeal to the Dynamic Interpretant
 
 
 
Division 8
 
 
 
(a) According to the Matter of Representative Interpretant
 
 
 
(b) According to the Nature of the Normal Interpretant
 
 
 
(c) According to the Purpose of the Eventual Interpretant
 
 
 
Division 9
 
 
 
(a) According to the Mode of being represented by Representative Interpretant
 
 
 
(b) According to the the relation of the Sign to the Normal Interpretant
 
 
 
(c) As to the Nature of the Influence of the Sign
 
 
 
Division 10
 
 
 
(a) According to the Mode of being represented to represent object by Sign, Truly
 
 
 
(b) According to the Triadic Relation of the Sign to its Dynamical Object and to
 
    its Normal Interpretant
 
 
 
(c) As to the Nature of the Assurance of the Utterance
 
 
 
 
 
 
 
LOR.  Work 4
 
 
 
 
 
 
 
JA: It may appear that one has side-stepped the issue of empiricism
 
    that way, but then all that stuff about the synthetic a priori
 
    raises its head, and we have Peirce's insight that mathematics
 
    is observational and even experimental, and so I must trail off
 
    into uncoordinated elliptical thoughts ...
 
 
 
HC: In contrast with this it strikes me that not all meanings of "analytic"
 
    and "synthetic" have much, if anything, to do with the "analytic and the
 
    synthetic", say, as in Quine's criticism of the "dualism" of empiricism.
 
    Surely no one thinks that a plausible analysis must be analytic or that
 
    synthetic materials tell us much about epistemology.  So, it is not
 
    clear that anything connected with analyticity or a priori knowledge
 
    will plausibly or immediately arise from a discussion of analytical
 
    geometry.  Prevalent mathematical assumptions or postulates, yes --
 
    but who says these are a prior?  Can't non-Euclidean geometry also
 
    be treated in the style of analytic geometry?
 
 
 
HC: I can imagine the a discussion might be forced in
 
    that direction, but the connections don't strike me
 
    as at all obvious or pressing.  Perhaps Jon would just
 
    like to bring up the notion of the synthetic apriori?
 
    But why?
 
 
 
 
 
 
 
LOR.  Work 5
 
 
 
 
 
 
 
HC = Howard Callaway
 
 
 
HC: But I see you as closer to my theme or challenge, when you say
 
    "The question is about the minimal adequate resource base for
 
    defining, deriving, or generating all of the concepts that we
 
    need for a given but very general type of application that we
 
    conventinally but equivocally refer to as 'logic'".
 
 
 
HC: I think it is accepted on all sides of the discussion that there
 
    is some sort of "equivalence" between the standard predicate logic
 
    and Peirce's graphs.
 
 
 
There you would be mistaken, except perhaps for the fact that
 
"some sort of equivalence" is vague to the depths of vacuity.
 
It most particularly does not mean "all sorts of equivalence"
 
or even "all important sorts of equivalence".  It is usually
 
interpreted to mean an extremely abstract type of syntactic
 
equivalence, and that is undoubtedly one important type of
 
equivalence that it is worth examining whether two formal
 
systems have or not.  But it precisely here that we find
 
another symptom of syntacticism, namely, the deprecation
 
of all other important qualities of formal systems, most
 
pointedly their "analystic, "semantic", and "pragmatic"
 
qualities, which make all the difference in how well the
 
system actually serves its users in a real world practice.
 
You can almost hear the whining and poohing coming from the
 
syntactic day camp, but those are the hard facts of the case.
 
 
 
HC: But we find this difference in relation to the vocabulary used to express
 
    identity.  From the point of view of starting with the predicate calculus,
 
    we don't need "teridentity".  So, this seems to suggest there is something
 
    of interesting contrast in Peirce's logic, which brings in this concept.
 
    The obvious question may be expressed by asking why we need teridentity
 
    in Peirce's system and how Peirce's system may recommend itself in contrast
 
    to the standard way with related concepts.  This does seem to call for
 
    a comparative evaluation of distinctive systems.  That is not an easy task,
 
    as I think we all understand. But I do think that if it is a goal to have
 
    Peirce's system better appreciated, then that kind of question must be
 
    addressed.  If "=" is sufficient in the standard predicate calculus,
 
    to say whatever we may need to say about the identity of terms, then
 
    what is the advantage of an alternative system which insists on always
 
    expressing identity of triples?
 
 
 
HC: The questions may look quite different, depending on where we start.
 
    But in any case, I thought I saw some better appreciation of the
 
    questions in your comments above.
 
 
 
 
 
 
 
LOR.  Work 6
 
 
 
 
 
 
 
It's been that way for about as long as anybody can remember, and
 
it will remain so, in spite of the spate of history rewriting and
 
image re-engineering that has become the new rage in self-styled
 
"analytic" circles.
 
 
 
 
 
 
 
LOR.  Work 7
 
 
 
 
 
 
 
The brands of objection that you continue to make, with no evidence
 
of reflection on the many explanations that I and others have taken
 
the time to write out for you, lead me to believe that you are just
 
not interested in making that effort.  That's okay, life is short,
 
the arts are long and many, there is always something else to do.
 
 
 
HC: For, if I make an assertion A&B, then I am not asserting
 
    that the statement A stands in a relation to a statement B.
 
    Instead, I am asserting the conjunction A&B (which logically
 
    implies both the conjuncts in view of the definition of "&").
 
    If "&" counts as a triadic relation, simply because it serves
 
    to conjoin two statements into a third, then it would seem that
 
    any binary relation 'R' will count as triadic, simply because
 
    it places two things into a relation, which is a "third" thing.
 
    By the same kind of reasoning a triadic relation, as ordinarily
 
    understood would be really 4-adic.
 
 
 
HC: Now, I think this is the kind of argument you are making, ...
 
 
 
No, it's the kind of argument that you are making.
 
I am not making that kind of argument, and Peirce
 
did not make that kind of argument.  Peirce used
 
his terms subject to definitions that would have
 
been understandable, and remain understandable,
 
to those of his readers who understand these
 
elementary definitions, either though their
 
prior acquaintance with standard concepts
 
or through their basic capacity to read
 
a well-formed, if novel definition.
 
 
 
Peirce made certain observations about the structure of logical concepts
 
and the structure of their referents.  Those observations are accurate
 
and important.  He expressed those observations in a form that is clear
 
to anybody who knows the meanings of the technical terms that he used,
 
and he is not responsible for the interpretations of those who don't.
 
 
 
HC: ... and it seems to both trivialize the claimed argument
 
    for teridentity, by trivializing the conception of what
 
    is to count as a triadic, as contrasted with a binary
 
    relation, and it also seems to introduce a confusion
 
    about what is is count as a binary, vs. a triadic
 
    relation.
 
 
 
Yes, the argument that you are making trivializes
 
just about everything in sight, but that is the
 
common and well-known property of any argument
 
that fails to base itself on a grasp of the
 
first elements of the subject matter.
 
 
 
HC: If this is mathematical realism, then so much the worse for
 
    mathematical realism.  I am content to think that we do not
 
    have a free hand in making up mathematical truth.
 
  
No, it's not mathematical realism. It is your reasoning,
+
===Commentary Note 12.6===
and it exhibits all of the symptoms of syntacticism that
 
I have already diagnosed.  It's a whole other culture
 
from what is pandemic in the practice of mathematics,
 
and it never fails to surprise me that people who
 
would never call themselves "relativists" in any
 
other matter of culture suddenly turn into just
 
that in matters of simple mathematical fact.
 
</pre>
 
  
==Logic Of Relatives : Old Series==
+
==References==
  
<pre>
+
* Boole, George (1854), ''An Investigation of the Laws of Thought, On Which are Founded the Mathematical Theories of Logic and Probabilities'', Macmillan, 1854Reprinted, Dover Publications, New York, NY, 1958.
00http://suo.ieee.org/ontology/thrd20.html#04416
 
01.  http://suo.ieee.org/ontology/msg04416.html
 
02.  http://suo.ieee.org/ontology/msg04417.html
 
03.  http://suo.ieee.org/ontology/msg04418.html
 
04.  http://suo.ieee.org/ontology/msg04419.html
 
05.  http://suo.ieee.org/ontology/msg04421.html
 
06.  http://suo.ieee.org/ontology/msg04422.html
 
07.  http://suo.ieee.org/ontology/msg04423.html
 
08.  http://suo.ieee.org/ontology/msg04424.html
 
09.  http://suo.ieee.org/ontology/msg04425.html
 
10.  http://suo.ieee.org/ontology/msg04426.html
 
11.  http://suo.ieee.org/ontology/msg04427.html
 
12.  http://suo.ieee.org/ontology/msg04431.html
 
13.  http://suo.ieee.org/ontology/msg04432.html
 
14.  http://suo.ieee.org/ontology/msg04435.html
 
15.  http://suo.ieee.org/ontology/msg04436.html
 
16.  http://suo.ieee.org/ontology/msg04437.html
 
17.  http://suo.ieee.org/ontology/msg04438.html
 
18.  http://suo.ieee.org/ontology/msg04439.html
 
19.  http://suo.ieee.org/ontology/msg04440.html
 
20.  http://suo.ieee.org/ontology/msg04441.html
 
21.  http://suo.ieee.org/ontology/msg04442.html
 
22.  http://suo.ieee.org/ontology/msg04443.html
 
23.  http://suo.ieee.org/ontology/msg04444.html
 
24.  http://suo.ieee.org/ontology/msg04445.html
 
25.  http://suo.ieee.org/ontology/msg04446.html
 
26.  http://suo.ieee.org/ontology/msg04447.html
 
27.  http://suo.ieee.org/ontology/msg04448.html
 
28.  http://suo.ieee.org/ontology/msg04449.html
 
29.  http://suo.ieee.org/ontology/msg04450.html
 
30.  http://suo.ieee.org/ontology/msg04451.html
 
31.  http://suo.ieee.org/ontology/msg04452.html
 
32.  http://suo.ieee.org/ontology/msg04453.html
 
33.  http://suo.ieee.org/ontology/msg04454.html
 
34.  http://suo.ieee.org/ontology/msg04456.html
 
35.  http://suo.ieee.org/ontology/msg04457.html
 
36.  http://suo.ieee.org/ontology/msg04458.html
 
37.  http://suo.ieee.org/ontology/msg04459.html
 
38.  http://suo.ieee.org/ontology/msg04462.html
 
39.  http://suo.ieee.org/ontology/msg04464.html
 
40.  http://suo.ieee.org/ontology/msg04473.html
 
41.  http://suo.ieee.org/ontology/msg04478.html
 
42.  http://suo.ieee.org/ontology/msg04484.html
 
43.  http://suo.ieee.org/ontology/msg04487.html
 
44.  http://suo.ieee.org/ontology/msg04488.html
 
45.  http://suo.ieee.org/ontology/msg04492.html
 
46.  http://suo.ieee.org/ontology/msg04497.html
 
47.  http://suo.ieee.org/ontology/msg04498.html
 
48.  http://suo.ieee.org/ontology/msg04499.html
 
49.  http://suo.ieee.org/ontology/msg04500.html
 
50.  http://suo.ieee.org/ontology/msg04501.html
 
51.  http://suo.ieee.org/ontology/msg04502.html
 
52.  http://suo.ieee.org/ontology/msg04503.html
 
53.  http://suo.ieee.org/ontology/msg04504.html
 
54.  http://suo.ieee.org/ontology/msg04506.html
 
55.  http://suo.ieee.org/ontology/msg04508.html
 
56.  http://suo.ieee.org/ontology/msg04509.html
 
57.  http://suo.ieee.org/ontology/msg04510.html
 
58.  http://suo.ieee.org/ontology/msg04511.html
 
59.  http://suo.ieee.org/ontology/msg04512.html
 
60.  http://suo.ieee.org/ontology/msg04513.html
 
61.  http://suo.ieee.org/ontology/msg04516.html
 
62.  http://suo.ieee.org/ontology/msg04517.html
 
63.  http://suo.ieee.org/ontology/msg04518.html
 
64.  http://suo.ieee.org/ontology/msg04521.html
 
65.  http://suo.ieee.org/ontology/msg04539.html
 
66.  http://suo.ieee.org/ontology/msg04541.html
 
67.  http://suo.ieee.org/ontology/msg04542.html
 
68.  http://suo.ieee.org/ontology/msg04543.html
 
</pre>
 
  
==Logic of Relatives : Discussion Notes==
+
* Peirce, C.S. (1870), &ldquo;Description of a Notation for the Logic of Relatives, Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic&rdquo;, ''Memoirs of the American Academy of Arts and Sciences'' 9, 317&ndash;378, 26 January 1870.  Reprinted, ''Collected Papers'' (CP&nbsp;3.45&ndash;149), ''Chronological Edition'' (CE&nbsp;2, 359&ndash;429).  Online [http://www.jstor.org/stable/25058006 (1)] [https://archive.org/details/jstor-25058006 (2)] [http://books.google.com/books?id=fFnWmf5oLaoC (3)].
  
<pre>
+
* Peirce, C.S., ''Collected Papers of Charles Sanders Peirce'', vols. 1&ndash;6, Charles Hartshorne and Paul Weiss (eds.), vols. 7&ndash;8, Arthur W. Burks (ed.), Harvard University Press, Cambridge, MA, 1931&ndash;1935, 1958Cited as (CP&nbsp;volume.paragraph).
00. http://suo.ieee.org/ontology/thrd19.html#04460
 
10.  http://suo.ieee.org/ontology/msg04460.html
 
11.  http://suo.ieee.org/ontology/msg04461.html
 
12.  http://suo.ieee.org/ontology/msg04471.html
 
13.  http://suo.ieee.org/ontology/msg04472.html
 
14.  http://suo.ieee.org/ontology/msg04475.html
 
15.  http://suo.ieee.org/ontology/msg04476.html
 
16.  http://suo.ieee.org/ontology/msg04477.html
 
17.  http://suo.ieee.org/ontology/msg04479.html
 
18.  http://suo.ieee.org/ontology/msg04480.html
 
19.  http://suo.ieee.org/ontology/msg04481.html
 
20.  http://suo.ieee.org/ontology/msg04482.html
 
21.  http://suo.ieee.org/ontology/msg04483.html
 
22.  http://suo.ieee.org/ontology/msg04485.html
 
23. http://suo.ieee.org/ontology/msg04486.html
 
24http://suo.ieee.org/ontology/msg04493.html
 
25.  http://suo.ieee.org/ontology/msg04494.html
 
26.  http://suo.ieee.org/ontology/msg04495.html
 
27.  http://suo.ieee.org/ontology/msg04496.html
 
</pre>
 
  
==Logic Of Relatives : 2003==
+
* Peirce, C.S., ''Writings of Charles S. Peirce : A Chronological Edition'', Peirce Edition Project (eds.), Indiana University Press, Bloomington and Indianoplis, IN, 1981&ndash;.  Cited as (CE&nbsp;volume, page).
  
<pre>
+
==Further Reading==
LOR.  http://stderr.org/pipermail/inquiry/2003-March/thread.html#186
 
LOR.  http://stderr.org/pipermail/inquiry/2003-April/thread.html#245
 
  
01.  http://stderr.org/pipermail/inquiry/2003-March/000186.html
+
* [[Charles Sanders Peirce (Bibliography)|Bibliography : Charles Sanders Peirce]].
02.  http://stderr.org/pipermail/inquiry/2003-March/000187.html
 
03.  http://stderr.org/pipermail/inquiry/2003-March/000188.html
 
04.  http://stderr.org/pipermail/inquiry/2003-March/000189.html
 
05.  http://stderr.org/pipermail/inquiry/2003-March/000190.html
 
06.  http://stderr.org/pipermail/inquiry/2003-March/000191.html
 
07.  http://stderr.org/pipermail/inquiry/2003-March/000194.html
 
08.  http://stderr.org/pipermail/inquiry/2003-March/000195.html
 
09.  http://stderr.org/pipermail/inquiry/2003-April/000245.html
 
10.  http://stderr.org/pipermail/inquiry/2003-April/000246.html
 
11.  http://stderr.org/pipermail/inquiry/2003-April/000247.html
 
12.  http://stderr.org/pipermail/inquiry/2003-April/000248.html
 
13.  http://stderr.org/pipermail/inquiry/2003-April/000249.html
 
14.  http://stderr.org/pipermail/inquiry/2003-April/000250.html
 
15.  http://stderr.org/pipermail/inquiry/2003-April/000251.html
 
16.  http://stderr.org/pipermail/inquiry/2003-April/000252.html
 
17.  http://stderr.org/pipermail/inquiry/2003-April/000253.html
 
18.  http://stderr.org/pipermail/inquiry/2003-April/000254.html
 
19.  http://stderr.org/pipermail/inquiry/2003-April/000255.html
 
20.  http://stderr.org/pipermail/inquiry/2003-April/000256.html
 
21.  http://stderr.org/pipermail/inquiry/2003-April/000257.html
 
22.  http://stderr.org/pipermail/inquiry/2003-April/000258.html
 
23.  http://stderr.org/pipermail/inquiry/2003-April/000259.html
 
24.  http://stderr.org/pipermail/inquiry/2003-April/000260.html
 
25.  http://stderr.org/pipermail/inquiry/2003-April/000261.html
 
26.  http://stderr.org/pipermail/inquiry/2003-April/000262.html
 
27.  http://stderr.org/pipermail/inquiry/2003-April/000263.html
 
28.  http://stderr.org/pipermail/inquiry/2003-April/000264.html
 
29.  http://stderr.org/pipermail/inquiry/2003-April/000265.html
 
30.  http://stderr.org/pipermail/inquiry/2003-April/000267.html
 
31.  http://stderr.org/pipermail/inquiry/2003-April/000268.html
 
32.  http://stderr.org/pipermail/inquiry/2003-April/000269.html
 
33.  http://stderr.org/pipermail/inquiry/2003-April/000270.html
 
34.  http://stderr.org/pipermail/inquiry/2003-April/000271.html
 
35.  http://stderr.org/pipermail/inquiry/2003-April/000273.html
 
36.  http://stderr.org/pipermail/inquiry/2003-April/000274.html
 
37.  http://stderr.org/pipermail/inquiry/2003-April/000275.html
 
38.  http://stderr.org/pipermail/inquiry/2003-April/000276.html
 
39.  http://stderr.org/pipermail/inquiry/2003-April/000277.html
 
40.  http://stderr.org/pipermail/inquiry/2003-April/000278.html
 
41.  http://stderr.org/pipermail/inquiry/2003-April/000279.html
 
42.  http://stderr.org/pipermail/inquiry/2003-April/000280.html
 
43.  http://stderr.org/pipermail/inquiry/2003-April/000281.html
 
44.  http://stderr.org/pipermail/inquiry/2003-April/000282.html
 
45.  http://stderr.org/pipermail/inquiry/2003-April/000283.html
 
46.  http://stderr.org/pipermail/inquiry/2003-April/000284.html
 
47.  http://stderr.org/pipermail/inquiry/2003-April/000285.html
 
48.  http://stderr.org/pipermail/inquiry/2003-April/000286.html
 
49.  http://stderr.org/pipermail/inquiry/2003-April/000287.html
 
50.  http://stderr.org/pipermail/inquiry/2003-April/000288.html
 
51.  http://stderr.org/pipermail/inquiry/2003-April/000289.html
 
52.  http://stderr.org/pipermail/inquiry/2003-April/000290.html
 
53.  http://stderr.org/pipermail/inquiry/2003-April/000291.html
 
54.  http://stderr.org/pipermail/inquiry/2003-April/000294.html
 
55.  http://stderr.org/pipermail/inquiry/2003-April/000295.html
 
56.  http://stderr.org/pipermail/inquiry/2003-April/000296.html
 
57.  http://stderr.org/pipermail/inquiry/2003-April/000297.html
 
58.  http://stderr.org/pipermail/inquiry/2003-April/000298.html
 
59.  http://stderr.org/pipermail/inquiry/2003-April/000299.html
 
60.  http://stderr.org/pipermail/inquiry/2003-April/000300.html
 
61.  http://stderr.org/pipermail/inquiry/2003-April/000301.html
 
62.  http://stderr.org/pipermail/inquiry/2003-April/000302.html
 
63.  http://stderr.org/pipermail/inquiry/2003-April/000303.html
 
64.  http://stderr.org/pipermail/inquiry/2003-April/000305.html
 
65.  http://stderr.org/pipermail/inquiry/2003-April/000306.html
 
66.  http://stderr.org/pipermail/inquiry/2003-April/000307.html
 
67.  http://stderr.org/pipermail/inquiry/2003-April/000308.html
 
68.  http://stderr.org/pipermail/inquiry/2003-April/000309.html
 
</pre>
 
  
==Logic Of Relatives : 2004==
+
* Brady, G. (2000), ''From Peirce to Skolem : A Neglected Chapter in the History of Logic'', Elsevier, Amsterdam.  [http://books.google.com/books?id=ahoH-tLm2S0C Online Preview].
  
<pre>
+
* Lambek, J., and Scott, P.J. (1986), ''Introduction to Higher Order Categorical Logic'', Cambridge University Press, Cambridge, UK.
00. http://stderr.org/pipermail/inquiry/2004-November/thread.html#1750
 
01. http://stderr.org/pipermail/inquiry/2004-November/001750.html
 
02.  http://stderr.org/pipermail/inquiry/2004-November/001751.html
 
03.  http://stderr.org/pipermail/inquiry/2004-November/001752.html
 
04.  http://stderr.org/pipermail/inquiry/2004-November/001753.html
 
05.  http://stderr.org/pipermail/inquiry/2004-November/001754.html
 
06.  http://stderr.org/pipermail/inquiry/2004-November/001760.html
 
07.  http://stderr.org/pipermail/inquiry/2004-November/001769.html
 
08.  http://stderr.org/pipermail/inquiry/2004-November/001774.html
 
09.  http://stderr.org/pipermail/inquiry/2004-November/001783.html
 
10.  http://stderr.org/pipermail/inquiry/2004-November/001794.html
 
11.  http://stderr.org/pipermail/inquiry/2004-November/001812.html
 
12.  http://stderr.org/pipermail/inquiry/2004-November/001842.html
 
</pre>
 
  
==Logic Of Relatives : Commentary==
+
* Mili, A., Desharnais, J., Mili, F., with Frappier, M. (1994), ''Computer Program Construction'', Oxford University Press, New York, NY.
  
<pre>
+
* Walsh, A. (2012), ''Relations Between Logic and Mathematics in the Work of Benjamin and Charles S. Peirce'', Docent Press, Boston, MA.
00.     http://stderr.org/pipermail/inquiry/2004-November/thread.html#1755
 
01.    http://stderr.org/pipermail/inquiry/2004-November/001755.html
 
02.    http://stderr.org/pipermail/inquiry/2004-November/001756.html
 
03.    http://stderr.org/pipermail/inquiry/2004-November/001757.html
 
04.    http://stderr.org/pipermail/inquiry/2004-November/001758.html
 
05.    http://stderr.org/pipermail/inquiry/2004-November/001759.html
 
06.    http://stderr.org/pipermail/inquiry/2004-November/001761.html
 
07.    http://stderr.org/pipermail/inquiry/2004-November/001770.html
 
08.1.  http://stderr.org/pipermail/inquiry/2004-November/001775.html
 
08.2.  http://stderr.org/pipermail/inquiry/2004-November/001776.html
 
08.3.  http://stderr.org/pipermail/inquiry/2004-November/001777.html
 
08.4.  http://stderr.org/pipermail/inquiry/2004-November/001778.html
 
08.5.  http://stderr.org/pipermail/inquiry/2004-November/001781.html
 
08.6.  http://stderr.org/pipermail/inquiry/2004-November/001782.html
 
09.1.  http://stderr.org/pipermail/inquiry/2004-November/001787.html
 
09.2.  http://stderr.org/pipermail/inquiry/2004-November/001788.html
 
09.3.  http://stderr.org/pipermail/inquiry/2004-November/001789.html
 
09.4.  http://stderr.org/pipermail/inquiry/2004-November/001790.html
 
09.5.  http://stderr.org/pipermail/inquiry/2004-November/001791.html
 
09.6.  http://stderr.org/pipermail/inquiry/2004-November/001792.html
 
09.7.  http://stderr.org/pipermail/inquiry/2004-November/001793.html
 
10.01.  http://stderr.org/pipermail/inquiry/2004-November/001795.html
 
10.02.  http://stderr.org/pipermail/inquiry/2004-November/001796.html
 
10.03.  http://stderr.org/pipermail/inquiry/2004-November/001797.html
 
10.04.  http://stderr.org/pipermail/inquiry/2004-November/001798.html
 
10.05.  http://stderr.org/pipermail/inquiry/2004-November/001799.html
 
10.06.  http://stderr.org/pipermail/inquiry/2004-November/001800.html
 
10.07.  http://stderr.org/pipermail/inquiry/2004-November/001801.html
 
10.08.  http://stderr.org/pipermail/inquiry/2004-November/001802.html
 
10.09.  http://stderr.org/pipermail/inquiry/2004-November/001803.html
 
10.10.  http://stderr.org/pipermail/inquiry/2004-November/001804.html
 
10.11.  http://stderr.org/pipermail/inquiry/2004-November/001805.html
 
11.01.  http://stderr.org/pipermail/inquiry/2004-November/001813.html
 
11.02.  http://stderr.org/pipermail/inquiry/2004-November/001814.html
 
11.03.  http://stderr.org/pipermail/inquiry/2004-November/001815.html
 
11.04.  http://stderr.org/pipermail/inquiry/2004-November/001816.html
 
11.05.  http://stderr.org/pipermail/inquiry/2004-November/001817.html
 
11.06http://stderr.org/pipermail/inquiry/2004-November/001818.html
 
11.07.  http://stderr.org/pipermail/inquiry/2004-November/001819.html
 
11.08.  http://stderr.org/pipermail/inquiry/2004-November/001820.html
 
11.09.  http://stderr.org/pipermail/inquiry/2004-November/001821.html
 
11.10.  http://stderr.org/pipermail/inquiry/2004-November/001822.html
 
11.11.  http://stderr.org/pipermail/inquiry/2004-November/001823.html
 
11.12.  http://stderr.org/pipermail/inquiry/2004-November/001824.html
 
11.13.  http://stderr.org/pipermail/inquiry/2004-November/001825.html
 
11.14.  http://stderr.org/pipermail/inquiry/2004-November/001826.html
 
11.15.  http://stderr.org/pipermail/inquiry/2004-November/001827.html
 
11.16.  http://stderr.org/pipermail/inquiry/2004-November/001828.html
 
11.17.  http://stderr.org/pipermail/inquiry/2004-November/001829.html
 
11.18.  http://stderr.org/pipermail/inquiry/2004-November/001830.html
 
11.19.  http://stderr.org/pipermail/inquiry/2004-November/001831.html
 
11.20.  http://stderr.org/pipermail/inquiry/2004-November/001832.html
 
11.21.  http://stderr.org/pipermail/inquiry/2004-November/001833.html
 
11.22.  http://stderr.org/pipermail/inquiry/2004-November/001834.html
 
11.23.  http://stderr.org/pipermail/inquiry/2004-November/001835.html
 
11.24.  http://stderr.org/pipermail/inquiry/2004-November/001836.html
 
12.    http://stderr.org/pipermail/inquiry/2004-November/001843.html
 
</pre>
 
  
==Logic Of Relatives : Discussion==
+
==See Also==
  
<pre>
+
{{col-begin}}
00.  http://suo.ieee.org/ontology/thrd20.html#04460
+
{{col-break}}
00.  http://stderr.org/pipermail/inquiry/2004-November/thread.html#1768
+
* [[Charles Sanders Peirce]]
00.  http://stderr.org/pipermail/inquiry/2005-January/thread.html#2301
+
* [[Logic of relatives]]
 +
* [[Logic of Relatives (1870)]]
 +
* [[Logic of Relatives (1883)]]
 +
{{col-break}}
 +
* [[Relation (mathematics)|Relation]]
 +
* [[Relation theory]]
 +
* [[Sign relation]]
 +
* [[Triadic relation]]
 +
{{col-end}}
  
10.  http://suo.ieee.org/ontology/msg04460.html
+
[[Category:Artificial Intelligence]]
11.  http://suo.ieee.org/ontology/msg04461.html
+
[[Category:Charles Sanders Peirce]]
12.  http://suo.ieee.org/ontology/msg04471.html
+
[[Category:Critical Thinking]]
13.  http://suo.ieee.org/ontology/msg04472.html
+
[[Category:Cybernetics]]
14.  http://suo.ieee.org/ontology/msg04475.html
+
[[Category:Education]]
15.  http://suo.ieee.org/ontology/msg04476.html
+
[[Category:Hermeneutics]]
16.  http://suo.ieee.org/ontology/msg04477.html
+
[[Category:Information Systems]]
17.  http://suo.ieee.org/ontology/msg04479.html
+
[[Category:Inquiry]]
18.  http://suo.ieee.org/ontology/msg04480.html
+
[[Category:Intelligence Amplification]]
19.  http://suo.ieee.org/ontology/msg04481.html
+
[[Category:Learning Organizations]]
20.  http://suo.ieee.org/ontology/msg04482.html
+
[[Category:Knowledge Representation]]
21.  http://suo.ieee.org/ontology/msg04483.html
+
[[Category:Logic]]
22.  http://suo.ieee.org/ontology/msg04485.html
+
[[Category:Logic Of Relatives]]
23.  http://suo.ieee.org/ontology/msg04486.html
+
[[Category:Logical Graphs]]
24.  http://suo.ieee.org/ontology/msg04493.html
+
[[Category:Mathematics]]
25.  http://suo.ieee.org/ontology/msg04494.html
+
[[Category:Normative Sciences]]
26.  http://suo.ieee.org/ontology/msg04495.html
+
[[Category:Philosophy]]
27.  http://suo.ieee.org/ontology/msg04496.html
+
[[Category:Pragmatics]]
28.  http://stderr.org/pipermail/inquiry/2004-November/001768.html
+
[[Category:Pragmatism]]
29.  http://stderr.org/pipermail/inquiry/2004-November/001838.html
+
[[Category:Relation Theory]]
30.  http://stderr.org/pipermail/inquiry/2004-November/001840.html
+
[[Category:Science]]
31.  http://stderr.org/pipermail/inquiry/2005-January/002301.html
+
[[Category:Semantics]]
</pre>
+
[[Category:Semiotics]]
 +
[[Category:Systems Science]]
 +
[[Category:Visualization]]

Latest revision as of 16:22, 29 December 2017

Note. The MathJax parser is not rendering this page properly.
Until it can be fixed please see the InterSciWiki version.

Author: Jon Awbrey

Peirce's text employs lower case letters for logical terms of general reference and upper case letters for logical terms of individual reference.  General terms fall into types — absolute terms, dyadic relative terms, higher adic relative terms — and Peirce employs different typefaces to distinguish these.  The following Tables indicate the typefaces that are used in the text below for Peirce's examples of general terms.


\(\text{Absolute Terms (Monadic Relatives)}\!\)

\(\begin{array}{ll} \mathrm{a}. & \text{animal} \\ \mathrm{b}. & \text{black} \\ \mathrm{f}. & \text{Frenchman} \\ \mathrm{h}. & \text{horse} \\ \mathrm{m}. & \text{man} \\ \mathrm{p}. & \text{President of the United States Senate} \\ \mathrm{r}. & \text{rich person} \\ \mathrm{u}. & \text{violinist} \\ \mathrm{v}. & \text{Vice-President of the United States} \\ \mathrm{w}. & \text{woman} \end{array}\)


\(\text{Simple Relative Terms (Dyadic Relatives)}\!\)

\(\begin{array}{ll} \mathit{a}. & \text{enemy} \\ \mathit{b}. & \text{benefactor} \\ \mathit{c}. & \text{conqueror} \\ \mathit{e}. & \text{emperor} \\ \mathit{h}. & \text{husband} \\ \mathit{l}. & \text{lover} \\ \mathit{m}. & \text{mother} \\ \mathit{n}. & \text{not} \\ \mathit{o}. & \text{owner} \\ \mathit{s}. & \text{servant} \\ \mathit{w}. & \text{wife} \end{array}\)


\(\text{Conjugative Terms (Higher Adic Relatives)}\!\)

\(\begin{array}{ll} \mathfrak{b}. & \text{betrayer to ------ of ------} \\ \mathfrak{g}. & \text{giver to ------ of ------} \\ \mathfrak{t}. & \text{transferrer from ------ to ------} \\ \mathfrak{w}. & \text{winner over of ------ to ------ from ------} \end{array}\)


Individual terms are taken to denote individual entities falling under a general term. Peirce uses upper case Roman letters for individual terms, for example, the individual horses \(\mathrm{H}, \mathrm{H}^{\prime}, \mathrm{H}^{\prime\prime}\) falling under the general term \(\mathrm{h}\!\) for horse.

The path to understanding Peirce's system and its wider implications for logic can be smoothed by paraphrasing his notations in a variety of contemporary mathematical formalisms, while preserving the semantics as much as possible. Remaining faithful to Peirce's orthography while adding parallel sets of stylistic conventions will, however, demand close attention to typography-in-context. Current style sheets for mathematical texts specify italics for mathematical variables, with upper case letters for sets and lower case letters for individuals. So we need to keep an eye out for the difference between the individual \(\mathrm{X}\!\) of the genus \(\mathrm{x}\!\) and the element \(x\!\) of the set \(X\!\) as we pass between the two styles of text.

Selection 1

Use of the Letters

The letters of the alphabet will denote logical signs.

Now logical terms are of three grand classes.

The first embraces those whose logical form involves only the conception of quality, and which therefore represent a thing simply as “a ——”. These discriminate objects in the most rudimentary way, which does not involve any consciousness of discrimination. They regard an object as it is in itself as such (quale); for example, as horse, tree, or man. These are absolute terms.

The second class embraces terms whose logical form involves the conception of relation, and which require the addition of another term to complete the denotation. These discriminate objects with a distinct consciousness of discrimination. They regard an object as over against another, that is as relative; as father of, lover of, or servant of. These are simple relative terms.

The third class embraces terms whose logical form involves the conception of bringing things into relation, and which require the addition of more than one term to complete the denotation. They discriminate not only with consciousness of discrimination, but with consciousness of its origin. They regard an object as medium or third between two others, that is as conjugative; as giver of —— to ——, or buyer of —— for —— from ——. These may be termed conjugative terms.

The conjugative term involves the conception of third, the relative that of second or other, the absolute term simply considers an object. No fourth class of terms exists involving the conception of fourth, because when that of third is introduced, since it involves the conception of bringing objects into relation, all higher numbers are given at once, inasmuch as the conception of bringing objects into relation is independent of the number of members of the relationship. Whether this reason for the fact that there is no fourth class of terms fundamentally different from the third is satisfactory or not, the fact itself is made perfectly evident by the study of the logic of relatives.

(Peirce, CP 3.63).

I am going to experiment with an interlacing commentary on Peirce's 1870 “Logic of Relatives” paper, revisiting some critical transitions from several different angles and calling attention to a variety of puzzles, problems, and potentials that are not so often remarked or tapped.

What strikes me about the initial installment this time around is its use of a certain pattern of argument that I can recognize as invoking a closure principle, and this is a figure of reasoning that Peirce uses in three other places: his discussion of continuous predicates, his definition of sign relations, and in the pragmatic maxim itself.

One might also call attention to the following two statements:

Now logical terms are of three grand classes.

No fourth class of terms exists involving the conception of fourth, because when that of third is introduced, since it involves the conception of bringing objects into relation, all higher numbers are given at once, inasmuch as the conception of bringing objects into relation is independent of the number of members of the relationship.

Selection 2

Numbers Corresponding to Letters

I propose to use the term “universe” to denote that class of individuals about which alone the whole discourse is understood to run. The universe, therefore, in this sense, as in Mr. De Morgan's, is different on different occasions. In this sense, moreover, discourse may run upon something which is not a subjective part of the universe; for instance, upon the qualities or collections of the individuals it contains.

I propose to assign to all logical terms, numbers; to an absolute term, the number of individuals it denotes; to a relative term, the average number of things so related to one individual. Thus in a universe of perfect men (men), the number of “tooth of” would be 32. The number of a relative with two correlates would be the average number of things so related to a pair of individuals; and so on for relatives of higher numbers of correlates. I propose to denote the number of a logical term by enclosing the term in square brackets, thus \([t].\!\)

(Peirce, CP 3.65).

Peirce's remarks at CP 3.65 are so replete with remarkable ideas, some of them so taken for granted in mathematical discourse that they usually escape explicit mention, and others so suggestive of things to come in a future remote from his time of writing, and yet so smoothly introduced in passing that it's all too easy to overlook their consequential significance, that I can do no better here than to highlight these ideas in other words, whose main advantage is to be a little more jarring to the mind's sensibilities.

  • This mapping of letters to numbers, or logical terms to mathematical quantities, is the very core of what "quantification theory" is all about, and definitely more to the point than the mere "innovation" of using distinctive symbols for the so-called "quantifiers". We will speak of this more later on.
  • The mapping of logical terms to numerical measures, to express it in current language, would probably be recognizable as some kind of "morphism" or "functor" from a logical domain to a quantitative co-domain.
  • Notice that Peirce follows the mathematician's usual practice, then and now, of making the status of being an "individual" or a "universal" relative to a discourse in progress. I have come to appreciate more and more of late how radically different this "patchwork" or "piecewise" approach to things is from the way of some philosophers who seem to be content with nothing less than many worlds domination, which means that they are never content and rarely get started toward the solution of any real problem. Just my observation, I hope you understand.
  • It is worth noting that Peirce takes the "plural denotation" of terms for granted, or what's the number of a term for, if it could not vary apart from being one or nil?
  • I also observe that Peirce takes the individual objects of a particular universe of discourse in a "generative" way, not a "totalizing" way, and thus they afford us with the basis for talking freely about collections, constructions, properties, qualities, subsets, and "higher types", as the phrase is mint.

Selection 3

The Signs of Inclusion, Equality, Etc.

I shall follow Boole in taking the sign of equality to signify identity. Thus, if \(\mathrm{v}\!\) denotes the Vice-President of the United States, and \(\mathrm{p}~\!\) the President of the Senate of the United States,

\(\mathrm{v} = \mathrm{p}\!\)

means that every Vice-President of the United States is President of the Senate, and every President of the United States Senate is Vice-President.

The sign “less than” is to be so taken that

\(\mathrm{f} < \mathrm{m}~\!\)

means that every Frenchman is a man, but there are men besides Frenchmen. Drobisch has used this sign in the same sense. It will follow from these significations of \(=\!\) and \(<\!\) that the sign \(-\!\!\!<\!\) (or \(\leqq\), “as small as”) will mean “is”. Thus,

\(\mathrm{f} ~-\!\!\!< \mathrm{m}\)

means “every Frenchman is a man”, without saying whether there are any other men or not. So,

\(\mathit{m} ~-\!\!\!< \mathit{l}\)

will mean that every mother of anything is a lover of the same thing; although this interpretation in some degree anticipates a convention to be made further on. These significations of \(=\!\) and \(<\!\) plainly conform to the indispensable conditions. Upon the transitive character of these relations the syllogism depends, for by virtue of it, from

  \(\mathrm{f} ~-\!\!\!< \mathrm{m}\)  

and

\(\mathrm{m} ~-\!\!\!< \mathrm{a}\)  

we can infer that

\(\mathrm{f} ~-\!\!\!< \mathrm{a}\)  

that is, from every Frenchman being a man and every man being an animal, that every Frenchman is an animal.

But not only do the significations of \(=\!\) and \(<\!\) here adopted fulfill all absolute requirements, but they have the supererogatory virtue of being very nearly the same as the common significations. Equality is, in fact, nothing but the identity of two numbers; numbers that are equal are those which are predicable of the same collections, just as terms that are identical are those which are predicable of the same classes. So, to write \(5 < 7\!\) is to say that \(5\!\) is part of \(7\!\), just as to write \(\mathrm{f} < \mathrm{m}~\!\) is to say that Frenchmen are part of men. Indeed, if \(\mathrm{f} < \mathrm{m}~\!\), then the number of Frenchmen is less than the number of men, and if \(\mathrm{v} = \mathrm{p}\!\), then the number of Vice-Presidents is equal to the number of Presidents of the Senate; so that the numbers may always be substituted for the terms themselves, in case no signs of operation occur in the equations or inequalities.

(Peirce, CP 3.66).

The quantifier mapping from terms to their numbers that Peirce signifies by means of the square bracket notation \([t]\!\) has one of its principal uses in providing a basis for the computation of frequencies, probabilities, and all of the other statistical measures that can be constructed from these, and thus in affording what may be called a principle of correspondence between probability theory and its limiting case in the forms of logic.

This brings us once again to the relativity of contingency and necessity, as one way of approaching necessity is through the avenue of probability, describing necessity as a probability of 1, but the whole apparatus of probability theory only figures in if it is cast against the backdrop of probability space axioms, the reference class of distributions, and the sample space that we cannot help but to abduce upon the scene of observations. Aye, there's the snake eyes. And with them we can see that there is always an irreducible quantum of facticity to all our necessities. More plainly spoken, it takes a fairly complex conceptual infrastructure just to begin speaking of probabilities, and this setting can only be set up by means of abductive, fallible, hypothetical, and inherently risky mental acts.

Pragmatic thinking is the logic of abduction, which is just another way of saying that it addresses the question: “What may be hoped?” We have to face the possibility that it may be just as impossible to speak of “absolute identity” with any hope of making practical philosophical sense as it is to speak of “absolute simultaneity” with any hope of making operational physical sense.

Selection 4

The Signs for Addition

The sign of addition is taken by Boole so that

\(x + y\!\)

denotes everything denoted by \(x\!\), and, besides, everything denoted by \(y\!\).

Thus

\(\mathrm{m} + \mathrm{w}~\!\)

denotes all men, and, besides, all women.

This signification for this sign is needed for connecting the notation of logic with that of the theory of probabilities. But if there is anything which is denoted by both terms of the sum, the latter no longer stands for any logical term on account of its implying that the objects denoted by one term are to be taken besides the objects denoted by the other.

For example,

\(\mathrm{f} + \mathrm{u}\!\)

means all Frenchmen besides all violinists, and, therefore, considered as a logical term, implies that all French violinists are besides themselves.

For this reason alone, in a paper which is published in the Proceedings of the Academy for March 17, 1867, I preferred to take as the regular addition of logic a non-invertible process, such that

\(\mathrm{m} ~+\!\!,~ \mathrm{b}\)

stands for all men and black things, without any implication that the black things are to be taken besides the men; and the study of the logic of relatives has supplied me with other weighty reasons for the same determination.

Since the publication of that paper, I have found that Mr. W. Stanley Jevons, in a tract called Pure Logic, or the Logic of Quality [1864], had anticipated me in substituting the same operation for Boole's addition, although he rejects Boole's operation entirely and writes the new one with a  \(+\!\)  sign while withholding from it the name of addition.

It is plain that both the regular non-invertible addition and the invertible addition satisfy the absolute conditions. But the notation has other recommendations. The conception of taking together involved in these processes is strongly analogous to that of summation, the sum of 2 and 5, for example, being the number of a collection which consists of a collection of two and a collection of five. Any logical equation or inequality in which no operation but addition is involved may be converted into a numerical equation or inequality by substituting the numbers of the several terms for the terms themselves — provided all the terms summed are mutually exclusive.

Addition being taken in this sense, nothing is to be denoted by zero, for then

\(x ~+\!\!,~ 0 ~=~ x\)

whatever is denoted by \(x\!\); and this is the definition of zero. This interpretation is given by Boole, and is very neat, on account of the resemblance between the ordinary conception of zero and that of nothing, and because we shall thus have

\([0] ~=~ 0.\)

(Peirce, CP 3.67).

A wealth of issues arises here that I hope to take up in depth at a later point, but for the moment I shall be able to mention only the barest sample of them in passing.

The two papers that precede this one in CP 3 are Peirce's papers of March and September 1867 in the Proceedings of the American Academy of Arts and Sciences, titled “On an Improvement in Boole's Calculus of Logic” and “Upon the Logic of Mathematics”, respectively. Among other things, these two papers provide us with further clues about the motivating considerations that brought Peirce to introduce the “number of a term” function, signified here by square brackets. I have already quoted from the “Logic of Mathematics” paper in a related connection. Here are the links to those excerpts:

Limited Mark Universes
(1)
(2)
(3)

In setting up a correspondence between “letters” and “numbers”, Peirce constructs a structure-preserving map from a logical domain to a numerical domain. That he does this deliberately is evidenced by the care that he takes with the conditions under which the chosen aspects of structure are preserved, along with his recognition of the critical fact that zeroes are preserved by the mapping.

Incidentally, Peirce appears to have an inkling of the problems that would later be caused by using the plus sign for inclusive disjunction, but his advice was overridden by the dialects of applied logic that developed in various communities, retarding the exchange of information among engineering, mathematical, and philosophical specialties all throughout the subsequent century.

Selection 5

The Signs for Multiplication

I shall adopt for the conception of multiplication the application of a relation, in such a way that, for example, \(\mathit{l}\mathrm{w}~\!\) shall denote whatever is lover of a woman. This notation is the same as that used by Mr. De Morgan, although he appears not to have had multiplication in his mind.

\(\mathit{s}(\mathrm{m} ~+\!\!,~ \mathrm{w})\) will, then, denote whatever is servant of anything of the class composed of men and women taken together. So that:

\(\mathit{s}(\mathrm{m} ~+\!\!,~ \mathrm{w}) ~=~ \mathit{s}\mathrm{m} ~+\!\!,~ \mathit{s}\mathrm{w}.\)

\((\mathit{l} ~+\!\!,~ \mathit{s})\mathrm{w}\) will denote whatever is lover or servant to a woman, and:

\((\mathit{l} ~+\!\!,~ \mathit{s})\mathrm{w} ~=~ \mathit{l}\mathrm{w} ~+\!\!,~ \mathit{s}\mathrm{w}.\)

\((\mathit{s}\mathit{l})\mathrm{w}\!\) will denote whatever stands to a woman in the relation of servant of a lover, and:

\((\mathit{s}\mathit{l})\mathrm{w} ~=~ \mathit{s}(\mathit{l}\mathrm{w}).\)

Thus all the absolute conditions of multiplication are satisfied.

The term “identical with ——” is a unity for this multiplication. That is to say, if we denote “identical with ——” by \(\mathit{1}\!\) we have:

\(x \mathit{1} ~=~ x ~ ,\)

whatever relative term \(x\!\) may be. For what is a lover of something identical with anything, is the same as a lover of that thing.

(Peirce, CP 3.68).

Peirce in 1870 is five years down the road from the Peirce of 1865–1866 who lectured extensively on the role of sign relations in the logic of scientific inquiry, articulating their involvement in the three types of inference, and inventing the concept of “information” to explain what it is that signs convey in the process. By this time, then, the semiotic or sign relational approach to logic is so implicit in his way of working that he does not always take the trouble to point out its distinctive features at each and every turn. So let's take a moment to draw out a few of these characters.

Sign relations, like any brand of non-trivial 3-adic relations, can become overwhelming to think about once the cardinality of the object, sign, and interpretant domains or the complexity of the relation itself ascends beyond the simplest examples. Furthermore, most of the strategies that we would normally use to control the complexity, like neglecting one of the domains, in effect, projecting the 3-adic sign relation onto one of its 2-adic faces, or focusing on a single ordered triple of the form \((o, s, i)\!\) at a time, can result in our receiving a distorted impression of the sign relation's true nature and structure.

I find that it helps me to draw, or at least to imagine drawing, diagrams of the following form, where I can keep tabs on what's an object, what's a sign, and what's an interpretant sign, for a selected set of sign-relational triples.

Here is how I would picture Peirce's example of equivalent terms, \(\mathrm{v} = \mathrm{p},\!\) where \({}^{\backprime\backprime} \mathrm{v} {}^{\prime\prime}\!\) denotes the Vice-President of the United States, and \({}^{\backprime\backprime} \mathrm{p} {}^{\prime\prime}\!\) denotes the President of the Senate of the United States.

LOR 1870 Figure 1.jpg
\(\text{Figure 1}~\!\)

Depending on whether we interpret the terms \({}^{\backprime\backprime} \mathrm{v} {}^{\prime\prime}\!\) and \({}^{\backprime\backprime} \mathrm{p} {}^{\prime\prime}\!\) as applying to persons who hold these offices at one particular time or as applying to all those persons who have held these offices over an extended period of history, their denotations may be either singular of plural, respectively.

As a shortcut technique for indicating general denotations or plural referents, I will use the elliptic convention that represents these by means of figures like “o o o” or “o … o”, placed at the object ends of sign relational triads.

For a more complex example, here is how I would picture Peirce's example of an equivalence between terms that comes about by applying one of the distributive laws, for relative multiplication over absolute summation.

LOR 1870 Figure 2.jpg
\(\text{Figure 2}\!\)

Selection 6

The Signs for Multiplication (cont.)

A conjugative term like giver naturally requires two correlates, one denoting the thing given, the other the recipient of the gift.

We must be able to distinguish, in our notation, the giver of \(\mathrm{A}\!\) to \(\mathrm{B}\!\) from the giver to \(\mathrm{A}\!\) of \(\mathrm{B}\!\), and, therefore, I suppose the signification of the letter equivalent to such a relative to distinguish the correlates as first, second, third, etc., so that “giver of —— to ——” and “giver to —— of ——” will be expressed by different letters.

Let \(\mathfrak{g}\) denote the latter of these conjugative terms. Then, the correlates or multiplicands of this multiplier cannot all stand directly after it, as is usual in multiplication, but may be ranged after it in regular order, so that:

\(\mathfrak{g}\mathit{x}\mathit{y}\)

will denote a giver to \(\mathit{x}\!\) of \(\mathit{y}\!\).

But according to the notation, \(\mathit{x}\!\) here multiplies \(\mathit{y}\!\), so that if we put for \(\mathit{x}\!\) owner (\(\mathit{o}\!\)), and for \(\mathit{y}\!\) horse (\(\mathrm{h}\!\)),

\(\mathfrak{g}\mathit{o}\mathrm{h}\)

appears to denote the giver of a horse to an owner of a horse. But let the individual horses be \(\mathrm{H}, \mathrm{H}^{\prime}, \mathrm{H}^{\prime\prime}\), etc.

Then:

\(\mathrm{h} ~=~ \mathrm{H} ~+\!\!,~ \mathrm{H}^{\prime} ~+\!\!,~ \mathrm{H}^{\prime\prime} ~+\!\!,~ \text{etc.}\)
\(\mathfrak{g}\mathit{o}\mathrm{h} ~=~ \mathfrak{g}\mathit{o}(\mathrm{H} ~+\!\!,~ \mathrm{H}^{\prime} ~+\!\!,~ \mathrm{H}^{\prime\prime} ~+\!\!,~ \text{etc.}) ~=~ \mathfrak{g}\mathit{o}\mathrm{H} ~+\!\!,~ \mathfrak{g}\mathit{o}\mathrm{H}^{\prime} ~+\!\!,~ \mathfrak{g}\mathit{o}\mathrm{H}^{\prime\prime} ~+\!\!,~ \text{etc.}\)

Now this last member must be interpreted as a giver of a horse to the owner of that horse, and this, therefore must be the interpretation of \(\mathfrak{g}\mathit{o}\mathrm{h}\). This is always very important. A term multiplied by two relatives shows that the same individual is in the two relations.

If we attempt to express the giver of a horse to a lover of a woman, and for that purpose write:

\(\mathfrak{g}\mathit{l}\mathrm{w}\mathrm{h}\),

we have written giver of a woman to a lover of her, and if we add brackets, thus,

\(\mathfrak{g}(\mathit{l}\mathrm{w})\mathrm{h}\),

we abandon the associative principle of multiplication.

A little reflection will show that the associative principle must in some form or other be abandoned at this point. But while this principle is sometimes falsified, it oftener holds, and a notation must be adopted which will show of itself when it holds. We already see that we cannot express multiplication by writing the multiplicand directly after the multiplier; let us then affix subjacent numbers after letters to show where their correlates are to be found. The first number shall denote how many factors must be counted from left to right to reach the first correlate, the second how many more must be counted to reach the second, and so on.

Then, the giver of a horse to a lover of a woman may be written:

\(\mathfrak{g}_{12} \mathit{l}_1 \mathrm{w} \mathrm{h} ~=~ \mathfrak{g}_{11} \mathit{l}_2 \mathrm{h} \mathrm{w} ~=~ \mathfrak{g}_{2(-1)} \mathrm{h} \mathit{l}_1 \mathrm{w}\).

Of course a negative number indicates that the former correlate follows the latter by the corresponding positive number.

A subjacent zero makes the term itself the correlate.

Thus,

\(\mathit{l}_0\!\)

denotes the lover of that lover or the lover of himself, just as \(\mathfrak{g}\mathit{o}\mathrm{h}\) denotes that the horse is given to the owner of itself, for to make a term doubly a correlate is, by the distributive principle, to make each individual doubly a correlate, so that:

\(\mathit{l}_0 ~=~ \mathit{L}_0 ~+\!\!,~ \mathit{L}_0^{\prime} ~+\!\!,~ \mathit{L}_0^{\prime\prime} ~+\!\!,~ \text{etc.}\)

A subjacent sign of infinity may indicate that the correlate is indeterminate, so that:

\(\mathit{l}_\infty\)

will denote a lover of something. We shall have some confirmation of this presently.

If the last subjacent number is a one it may be omitted. Thus we shall have:

\(\mathit{l}_1 ~=~ \mathit{l}\),
\(\mathfrak{g}_{11} ~=~ \mathfrak{g}_1 ~=~ \mathfrak{g}\).

This enables us to retain our former expressions \(\mathit{l}\mathrm{w}~\!\), \(\mathfrak{g}\mathit{o}\mathrm{h}\), etc.

(Peirce, CP 3.69–70).

Comment : Sets as Logical Sums

Peirce's way of representing sets as logical sums may seem archaic, but it is quite often used, and is actually the tool of choice in many branches of algebra, combinatorics, computing, and statistics to this very day.

Peirce's application to logic is fairly novel, and the degree of his elaboration of the logic of relative terms is certainly original with him, but this particular genre of representation, commonly going under the handle of generating functions, goes way back, well before anyone thought to stick a flag in set theory as a separate territory or to try to fence off our native possessions of it with expressly decreed axioms. And back in the days when a computer was just a person who computed, before we had the sorts of electronic register machines that we take so much for granted today, mathematicians were constantly using generating functions as a rough and ready type of addressable memory to sort, store, and keep track of their accounts of a wide variety of formal objects of thought.

Let us look at a few simple examples of generating functions, much as I encountered them during my own first adventures in the Fair Land Of Combinatoria.

Suppose that we are given a set of three elements, say, \(\{ a, b, c \},\!\) and we are asked to find all the ways of choosing a subset from this collection.

We can represent this problem setup as the problem of computing the following product:

\((1 + a)(1 + b)(1 + c).\!\)

The factor \((1 + a)\!\) represents the option that we have, in choosing a subset of \(\{ a, b, c \},\!\) to leave the element \(a\!\) out (signified by the \(1\!\)), or else to include it (signified by the \(a\!\)), and likewise for the other elements \(b\!\) and \(c\!\) in their turns.

Probably on account of all those years I flippered away playing the oldtime pinball machines, I tend to imagine a product like this being displayed in a vertical array:

\(\begin{matrix} (1 ~+~ a) \\ (1 ~+~ b) \\ (1 ~+~ c) \end{matrix}\)

I picture this as a playboard with six bumpers, the ball chuting down the board in such a career that it strikes exactly one of the two bumpers on each and every one of the three levels.

So a trajectory of the ball where it hits the \(a\!\) bumper on the 1st level, hits the \(1\!\) bumper on the 2nd level, hits the \(c\!\) bumper on the 3rd level, and then exits the board, represents a single term in the desired product and corresponds to the subset \(\{ a, c \}.\!\)

Multiplying out the product \((1 + a)(1 + b)(1 + c),\!\) one obtains:

\(\begin{array}{*{15}{c}} 1 & + & a & + & b & + & c & + & ab & + & ac & + & bc & + & abc. \end{array}\)

And this informs us that the subsets of choice are:

\(\begin{matrix} \varnothing, & \{ a \}, & \{ b \}, & \{ c \}, & \{ a, b \}, & \{ a, c \}, & \{ b, c \}, & \{ a, b, c \}. \end{matrix}\)

Selection 7

The Signs for Multiplication (cont.)

The associative principle does not hold in this counting of factors. Because it does not hold, these subjacent numbers are frequently inconvenient in practice, and I therefore use also another mode of showing where the correlate of a term is to be found. This is by means of the marks of reference, \(\dagger ~ \ddagger ~ \parallel ~ \S ~ \P\), which are placed subjacent to the relative term and before and above the correlate. Thus, giver of a horse to a lover of a woman may be written:

\(\mathfrak{g}_{\dagger\ddagger} \, ^\dagger\mathit{l}_\parallel \, ^\parallel\mathrm{w} \, ^\ddagger\mathrm{h}\)

The asterisk I use exclusively to refer to the last correlate of the last relative of the algebraic term.

Now, considering the order of multiplication to be: — a term, a correlate of it, a correlate of that correlate, etc. — there is no violation of the associative principle. The only violations of it in this mode of notation are that in thus passing from relative to correlate, we skip about among the factors in an irregular manner, and that we cannot substitute in such an expression as \(\mathfrak{g}\mathit{o}\mathrm{h}\) a single letter for \(\mathit{o}\mathrm{h}.\!\)

I would suggest that such a notation may be found useful in treating other cases of non-associative multiplication. By comparing this with what was said above [in CP 3.55] concerning functional multiplication, it appears that multiplication by a conjugative term is functional, and that the letter denoting such a term is a symbol of operation. I am therefore using two alphabets, the Greek and Kennerly, where only one was necessary. But it is convenient to use both.

(Peirce, CP 3.71–72).

Comment : Proto-Graphical Syntax

It is clear from our last excerpt that Peirce is already on the verge of a graphical syntax for the logic of relatives. Indeed, it seems likely that he had already reached this point in his own thinking.

For instance, it seems quite impossible to read his last variation on the theme of a “giver of a horse to a lover of a woman” without drawing lines of identity to connect up the corresponding marks of reference, like this:

LOR 1870 Figure 3.jpg (3)

Selection 8

The Signs for Multiplication (cont.)

Thus far, we have considered the multiplication of relative terms only. Since our conception of multiplication is the application of a relation, we can only multiply absolute terms by considering them as relatives.

Now the absolute term “man” is really exactly equivalent to the relative term “man that is ——”, and so with any other. I shall write a comma after any absolute term to show that it is so regarded as a relative term.

Then “man that is black” will be written:

\(\mathrm{m},\!\mathrm{b}\!\)

But not only may any absolute term be thus regarded as a relative term, but any relative term may in the same way be regarded as a relative with one correlate more. It is convenient to take this additional correlate as the first one.

Then:

\(\mathit{l},\!\mathit{s}\mathrm{w}\)

will denote a lover of a woman that is a servant of that woman.

The comma here after \(\mathit{l}\!\) should not be considered as altering at all the meaning of \(\mathit{l}\!\), but as only a subjacent sign, serving to alter the arrangement of the correlates.

In point of fact, since a comma may be added in this way to any relative term, it may be added to one of these very relatives formed by a comma, and thus by the addition of two commas an absolute term becomes a relative of two correlates.

So:

\(\mathrm{m},\!,\!\mathrm{b},\!\mathrm{r}\)

interpreted like

\(\mathfrak{g}\mathit{o}\mathrm{h}\)

means a man that is a rich individual and is a black that is that rich individual.

But this has no other meaning than:

\(\mathrm{m},\!\mathrm{b},\!\mathrm{r}\)

or a man that is a black that is rich.

Thus we see that, after one comma is added, the addition of another does not change the meaning at all, so that whatever has one comma after it must be regarded as having an infinite number.

If, therefore, \(\mathit{l},\!,\!\mathit{s}\mathrm{w}\) is not the same as \(\mathit{l},\!\mathit{s}\mathrm{w}\) (as it plainly is not, because the latter means a lover and servant of a woman, and the former a lover of and servant of and same as a woman), this is simply because the writing of the comma alters the arrangement of the correlates.

And if we are to suppose that absolute terms are multipliers at all (as mathematical generality demands that we should}, we must regard every term as being a relative requiring an infinite number of correlates to its virtual infinite series “that is —— and is —— and is —— etc.”

Now a relative formed by a comma of course receives its subjacent numbers like any relative, but the question is, What are to be the implied subjacent numbers for these implied correlates?

Any term may be regarded as having an infinite number of factors, those at the end being ones, thus:

\(\mathit{l},\!\mathit{s}\mathrm{w} ~=~ \mathit{l},\!\mathit{s}\mathit{w},\!\mathit{1},\!\mathit{1},\!\mathit{1},\!\mathit{1},\!\mathit{1},\!\mathit{1},\!\mathit{1}, ~\text{etc.}\)

A subjacent number may therefore be as great as we please.

But all these ones denote the same identical individual denoted by \(\mathrm{w}\!\); what then can be the subjacent numbers to be applied to \(\mathit{s}\!\), for instance, on account of its infinite “that is”'s? What numbers can separate it from being identical with \(\mathrm{w}\!\)? There are only two. The first is zero, which plainly neutralizes a comma completely, since

\(\mathit{s},_0\!\mathrm{w} ~=~ \mathit{s}\mathrm{w}\)

and the other is infinity; for as \(1^\infty\) is indeterminate in ordinary algbra, so it will be shown hereafter to be here, so that to remove the correlate by the product of an infinite series of ones is to leave it indeterminate.

Accordingly,

\(\mathrm{m},_\infty\)

should be regarded as expressing some man.

Any term, then, is properly to be regarded as having an infinite number of commas, all or some of which are neutralized by zeros.

“Something” may then be expressed by:

\(\mathit{1}_\infty\!\)

I shall for brevity frequently express this by an antique figure one \((\mathfrak{1}).\)

“Anything” by:

\(\mathit{1}_0\!\)

I shall often also write a straight \(1\!\) for anything.

(Peirce, CP 3.73).

Commentary Note 8.1

To my way of thinking, CP 3.73 is one of the most remarkable passages in the history of logic. In this first pass over its deeper contents I won't be able to accord it much more than a superficial dusting off.

Let us imagine a concrete example that will serve in developing the uses of Peirce's notation. Entertain a discourse whose universe \(X\!\) will remind us a little of the cast of characters in Shakespeare's Othello.

\(X ~=~ \{ \mathrm{Bianca}, \mathrm{Cassio}, \mathrm{Clown}, \mathrm{Desdemona}, \mathrm{Emilia}, \mathrm{Iago}, \mathrm{Othello} \}.\)

The universe \(X\!\) is “that class of individuals about which alone the whole discourse is understood to run” but its marking out for special recognition as a universe of discourse in no way rules out the possibility that “discourse may run upon something which is not a subjective part of the universe; for instance, upon the qualities or collections of the individuals it contains” (CP 3.65).

In order to provide ourselves with the convenience of abbreviated terms, while preserving Peirce's conventions about capitalization, we may use the alternate names \(^{\backprime\backprime}\mathrm{u}^{\prime\prime}\) for the universe \(X\!\) and \(^{\backprime\backprime}\mathrm{Jeste}^{\prime\prime}\) for the character \(\mathrm{Clown}.~\!\) This permits the above description of the universe of discourse to be rewritten in the following fashion:

\(\mathrm{u} ~=~ \{ \mathrm{B}, \mathrm{C}, \mathrm{D}, \mathrm{E}, \mathrm{I}, \mathrm{J}, \mathrm{O} \}\)

This specification of the universe of discourse could be summed up in Peirce's notation by the following equation:

\(\begin{array}{*{15}{c}} \mathbf{1} & = & \mathrm{B} & +\!\!, & \mathrm{C} & +\!\!, & \mathrm{D} & +\!\!, & \mathrm{E} & +\!\!, & \mathrm{I} & +\!\!, & \mathrm{J} & +\!\!, & \mathrm{O} \end{array}\)

Within this discussion, then, the individual terms are as follows:

\(\begin{matrix} ^{\backprime\backprime}\mathrm{B}^{\prime\prime}, & ^{\backprime\backprime}\mathrm{C}^{\prime\prime}, & ^{\backprime\backprime}\mathrm{D}^{\prime\prime}, & ^{\backprime\backprime}\mathrm{E}^{\prime\prime}, & ^{\backprime\backprime}\mathrm{I}^{\prime\prime}, & ^{\backprime\backprime}\mathrm{J}^{\prime\prime}, & ^{\backprime\backprime}\mathrm{O}^{\prime\prime} \end{matrix}\)

Each of these terms denotes in a singular fashion the corresponding individual in \(X.\!\)

By way of general terms in this discussion, we may begin with the following set:

\(\begin{array}{ccl} ^{\backprime\backprime}\mathrm{b}^{\prime\prime} & = & ^{\backprime\backprime}\mathrm{black}^{\prime\prime} \'"`UNIQ-MathJax1-QINU`"' <br> {| align="center" cellpadding="10" | [[Image:LOR 1870 Figure 7.0.jpg]] || (7) |} {| align="center" cellpadding="10" | [[Image:LOR 1870 Figure 8.0.jpg]] || (8) |} One way to approach the problem of “information fusion” in Peirce's syntax is to soften the distinction between adjacent terms and subjacent signs and to treat the types of constraints that they separately signify more on a par with each other. To that purpose, I will set forth a way of thinking about relational composition that emphasizes the set-theoretic constraints involved in the construction of a composite. For example, suppose that we are given the relations \(L \subseteq X \times Y\) and \(M \subseteq Y \times Z.\) Table 9 and Figure 10 present two ways of picturing the constraints that are involved in constructing the relational composition \(L \circ M \subseteq X \times Z.\)


\(\text{Table 9.} ~~ \text{Relational Composition}\!\)
  \(\mathit{1}\!\) \(\mathit{1}\!\) \(\mathit{1}\!\)
\(L\!\) \(X\!\) \(Y\!\)  
\(M\!\)   \(Y\!\) \(Z\!\)
\(L \circ M\!\) \(X\!\)   \(Z\!\)


The way to read Table 9 is to imagine that you are playing a game that involves placing tokens on the squares of a board that is marked in just this way. The rules are that you have to place a single token on each marked square in the middle of the board in such a way that all of the indicated constraints are satisfied. That is to say, you have to place a token whose denomination is a value in the set \(X\!\) on each of the squares marked \({}^{\backprime\backprime} X {}^{\prime\prime},\) and similarly for the squares marked \({}^{\backprime\backprime} Y {}^{\prime\prime}\) and \({}^{\backprime\backprime} Z {}^{\prime\prime},\) meanwhile leaving all of the blank squares empty. Furthermore, the tokens placed in each row and column have to obey the relational constraints that are indicated at the heads of the corresponding row and column. Thus, the two tokens from \(X\!\) have to denominate the very same value from \(X,\!\) and likewise for \(Y\!\) and \(Z,\!\) while the pairs of tokens on the rows marked \({}^{\backprime\backprime} L {}^{\prime\prime}\) and \({}^{\backprime\backprime} M {}^{\prime\prime}\) are required to denote elements that are in the relations \(L\!\) and \(M,\!\) respectively. The upshot is that when just this much is done, that is, when the \(L,\!\) \(M,\!\) and \(\mathit{1}\!\) relations are satisfied, then the row marked \({}^{\backprime\backprime} L \circ M {}^{\prime\prime}\) will automatically bear the tokens of a pair of elements in the composite relation \(L \circ M.\!\)

Figure 10 shows a different way of viewing the same situation.


File:LOR 1870 Figure 10.jpg (10)

Commentary Note 10.3

I will devote some time to drawing out the relationships that exist among the different pictures of relations and relative terms that were shown above, or as redrawn here:


File:LOR 1870 Figure 7.0.jpg (11)
File:LOR 1870 Figure 8.0.jpg (12)

Figures 11 and 12 present examples of relative multiplication in one of the styles of syntax that Peirce used, to which I added lines of identity to connect the corresponding marks of reference. These pictures are adapted to showing the anatomy of relative terms, while the forms of analysis illustrated in Table 13 and Figure 14 are designed to highlight the structures of the objective relations themselves.


\(\text{Table 13.} ~~ \text{Relational Composition}\!\)
  \(\mathit{1}\!\) \(\mathit{1}\!\) \(\mathit{1}\!\)
\(L\!\) \(X\!\) \(Y\!\)  
\(S\!\)   \(Y\!\) \(Z\!\)
\(L \circ S\!\) \(X\!\)   \(Z\!\)


File:LOR 1870 Figure 14.jpg (14)

There are many ways that Peirce might have gotten from his 1870 Notation for the Logic of Relatives to his more evolved systems of Logical Graphs. It is interesting to speculate on how the metamorphosis might have been accomplished by way of transformations that act on these nascent forms of syntax and that take place not too far from the pale of its means, that is, as nearly as possible according to the rules and the permissions of the initial system itself.

In Existential Graphs, a relation is represented by a node whose degree is the adicity of that relation, and which is adjacent via lines of identity to the nodes that represent its correlative relations, including as a special case any of its terminal individual arguments.

In the 1870 Logic of Relatives, implicit lines of identity are invoked by the subjacent numbers and marks of reference only when a correlate of some relation is the relate of some relation. Thus, the principal relate, which is not a correlate of any explicit relation, is not singled out in this way.

Remarkably enough, the comma modifier itself provides us with a mechanism to abstract the logic of relations from the logic of relatives, and thus to forge a possible link between the syntax of relative terms and the more graphical depiction of the objective relations themselves.

Figure 15 demonstrates this possibility, posing a transitional case between the style of syntax in Figure 11 and the picture of composition in Figure 14.


File:LOR 1870 Figure 15.jpg (15)

In this composite sketch the diagonal extension \(\mathit{1}\!\) of the universe \(\mathbf{1}\!\) is invoked up front to anchor an explicit line of identity for the leading relate of the composition, while the terminal argument \(\mathrm{w}\!\) has been generalized to the whole universe \(\mathbf{1},\!\) in effect, executing an act of abstraction. This type of universal bracketing isolates the composing of the relations \(L\!\) and \(S\!\) to form the composite \(L \circ S.\!\) The three relational domains \(X, Y, Z\!\) may be distinguished from one another, or else rolled up into a single universe of discourse, as one prefers.

Commentary Note 10.4

From now on I will use the forms of analysis exemplified in the last set of Figures and Tables as a routine bridge between the logic of relative terms and the logic of their extended relations. For future reference, we may think of Table 13 as illustrating the spreadsheet model of relational composition, while Figure 14 may be thought of as making a start toward a hypergraph model of generalized compositions. I will explain the hypergraph model in some detail at a later point. The transitional form of analysis represented by Figure 15 may be called the universal bracketing of relatives as relations.

Commentary Note 10.5

We have sufficiently covered the application of the comma functor, or the diagonal extension, to absolute terms, so let us return to where we were in working our way through CP 3.73 and see whether we can validate Peirce's statements about the “commifications” of 2-adic relative terms that yield their 3-adic diagonal extensions.

But not only may any absolute term be thus regarded as a relative term, but any relative term may in the same way be regarded as a relative with one correlate more. It is convenient to take this additional correlate as the first one.

Then:

\(\mathit{l},\!\mathit{s}\mathrm{w}\)

will denote a lover of a woman that is a servant of that woman.

The comma here after \(\mathit{l}\!\) should not be considered as altering at all the meaning of \(\mathit{l}\!\), but as only a subjacent sign, serving to alter the arrangement of the correlates.

(Peirce, CP 3.73).

Just to plant our feet on a more solid stage, let's apply this idea to the Othello example. For this performance only, just to make the example more interesting, let us assume that \(\mathrm{Jeste ~ (J)}\!\) is secretly in love with \(\mathrm{Desdemona ~ (D)}.\!\)

Then we begin with the modified data set:

\(\begin{array}{*{15}{c}} \mathrm{w} & = & \mathrm{B} & +\!\!, & \mathrm{D} & +\!\!, & \mathrm{E} \'"`UNIQ-MathJax2-QINU`"' ==='"`UNIQ--h-73--QINU`"'Commentary Note 11.14=== Now, as promised, let's look at a more homely example of a morphism, say, any one of the mappings \(J : \mathbb{R} \to \mathbb{R}\!\) (roughly speaking) that are commonly known as logarithm functions, where you get to pick your favorite base. In this case, \(K(r, s) = r + s~\!\) and \(L(u, v) = u \cdot v,\!\) and the defining formula \(J(L(u, v)) = K(Ju, Jv)\!\) comes out looking like \(J(u \cdot v) = J(u) + J(v),\!\) writing a dot \((\cdot)~\!\) and a plus sign \((+)\!\) for the ordinary binary operations of arithmetical multiplication and arithmetical summation, respectively.


File:LOR 1870 Figure 49.jpg (49)

Thus, where the image \(J\!\) is the logarithm map, the compound \(K\!\) is the numerical sum, and the ligature \(L\!\) is the numerical product, one has the following rule of thumb:

\(\textit{The~image~of~the~product~is~the~sum~of~the~images.}\)

\(\begin{array}{lll} J(u \cdot v) & = & J(u) + J(v) \'"`UNIQ-MathJax3-QINU`"' So let us try to uncross Peirce's manifestly chiasmatic encryption of the condition that is called on in support of this preservation. The proviso for the equation \([xy] = [x][y]\!\) to hold is this:

There are just as many \(x\!\)'s per \(y\!\) as there are per things, things of the universe.

(Peirce, CP 3.76).

Returning to the example that Peirce gives:

NOF 4.2

For instance, if our universe is perfect men, and there are as many teeth to a Frenchman (perfect understood) as there are to any one of the universe, then:

\([\mathit{t}][\mathrm{f}] ~=~ [\mathit{t}\mathrm{f}]\)

holds arithmetically.

(Peirce, CP 3.76).

Now that is something that we can sink our teeth into and trace the bigraph representation of the situation. It will help to recall our first examination of the “tooth of” relation and to adjust the picture we sketched of it on that occasion.

Transcribing Peirce's example:

Let \(\mathrm{m} = \text{man}\!\)  
 
and \(\mathit{t} = \text{tooth of}\,\underline{~~ ~~}.\!\)  
 
Then \(v(\mathit{t}) ~=~ [\mathit{t}] ~=~ \frac{[\mathit{t}\mathrm{m}]}{[\mathrm{m}]}.\!\)  

That is to say, the number of the relative term \(\text{tooth of}\,\underline{~~ ~~}\!\) is equal to the number of teeth of humans divided by the number of humans. In a universe of perfect human dentition this gives a quotient of \(32.\!\)

The dyadic relative term \(t\!\) determines a dyadic relation \(T \subseteq X \times Y,\) where \(X\!\) contains all the teeth and \(Y\!\) contains all the people that happen to be under discussion.

To make the case as simple as possible and still cover the point, suppose there are just four people in our universe of discourse and just two of them are French. The bigraphical composition below shows the pertinent facts of the case.

File:LOR 1870 Figure 52.jpg (52)

In this picture the order of relational composition flows down the page. For convenience in composing relations, the absolute term \(\mathrm{f} = \text{Frenchman}\!\) is inflected by the comma functor to form the dyadic relative term \(\mathrm{f,} = \text{Frenchman that is}\,\underline{~~ ~~},\!\) which in turn determines the idempotent representation of Frenchmen as a subset of mankind, \(F \subseteq Y \times Y.\!\)

By way of a legend for the figure, we have the following data:

\(\begin{array}{lllr} \mathrm{m} & = & \mathrm{J} ~+\!\!,~ \mathrm{K} ~+\!\!,~ \mathrm{L} ~+\!\!,~ \mathrm{M} \qquad = & \mathbf{1} \'"`UNIQ-MathJax4-QINU`"' and \(\mathrm{P}(\mathrm{b}) = \frac{1}{7}.\)

If these were independent terms we would have\[\mathrm{P}(\mathrm{m}\mathrm{b}) = \frac{4}{49}.\]

In point of fact, however, we have\[\mathrm{P}(\mathrm{m}\mathrm{b}) = \mathrm{P}(\mathrm{b}) = \frac{1}{7}.\]

Another way to see it is to observe that\[\mathrm{P}(\mathrm{b}|\mathrm{m}) = \frac{1}{4}\] while \(\mathrm{P}(\mathrm{b}) = \frac{1}{7}.\)

Commentary Note 11.23

Peirce's description of logical conjunction and conditional probability via the logic of relatives and the mathematics of relations is critical to understanding the relationship between logic and measurement, in effect, the qualitative and quantitative aspects of inquiry. To ground this connection firmly in mind, I will try to sum up as succinctly as possible, in more current notation, the lesson we ought to take away from Peirce's last “number of” example, since I know the account I have given so far may appear to have wandered widely.

NOF 4.4

So if men are just as apt to be black as things in general,

\([\mathrm{m,}][\mathrm{b}] ~=~ [\mathrm{m,}\mathrm{b}],\!\)

where the difference between \([\mathrm{m}]\!\) and \([\mathrm{m,}]\!\) must not be overlooked.

(Peirce, CP 3.76).

In different lights the formula \([\mathrm{m,}\mathrm{b}] = [\mathrm{m,}][\mathrm{b}]\!\) presents itself as an aimed arrow, fair sampling, or statistical independence condition. The concept of independence was illustrated above by means of a case where independence fails. The details of that counterexample are summarized below.

File:LOR 1870 Figure 53.jpg (54)

The condition that “men are just as apt to be black as things in general” is expressed in terms of conditional probabilities as \(\mathrm{P}(\mathrm{b}|\mathrm{m}) = \mathrm{P}(\mathrm{b}),\!\) which means that the probability of the event \(\mathrm{b}\!\) given the event \(\mathrm{m}\!\) is equal to the unconditional probability of the event \(\mathrm{b}.\!\)

In the Othello example, it is enough to observe that \(\mathrm{P}(\mathrm{b}|\mathrm{m}) = \tfrac{1}{4}\!\) while \(\mathrm{P}(\mathrm{b}) = \tfrac{1}{7}\!\) in order to recognize the bias or dependency of the sampling map.

The reduction of a conditional probability to an absolute probability, as \(\mathrm{P}(A|Z) = \mathrm{P}(A),\!\) is one of the ways we come to recognize the condition of independence, \(\mathrm{P}(AZ) = \mathrm{P}(A)P(Z),\!\) via the definition of conditional probability, \(\mathrm{P}(A|Z) = \displaystyle{\mathrm{P}(AZ) \over \mathrm{P}(Z)}.\!\)

To recall the derivation, the definition of conditional probability plus the independence condition yields \(\mathrm{P}(A|Z) = \displaystyle{\mathrm{P}(AZ) \over P(Z)} = \displaystyle{\mathrm{P}(A)\mathrm{P}(Z) \over \mathrm{P}(Z)},\!\) in short, \(\mathrm{P}(A|Z) = \mathrm{P}(A).\!\)

As Hamlet discovered, there's a lot to be learned from turning a crank.

Commentary Note 11.24

We come to the end of the “number of” examples that we found on our agenda at this point in the text:

NOF 4.5

It is to be observed that

\([\mathit{1}] ~=~ 1.\)

Boole was the first to show this connection between logic and probabilities. He was restricted, however, to absolute terms. I do not remember having seen any extension of probability to relatives, except the ordinary theory of expectation.

Our logical multiplication, then, satisfies the essential conditions of multiplication, has a unity, has a conception similar to that of admitted multiplications, and contains numerical multiplication as a case under it.

(Peirce, CP 3.76 and CE 2, 376).

There are problems with the printing of the text at this point. Let us first recall the conventions we are using in this transcription, in particular, \(\mathit{1}\!\) for the italic 1 that signifies the dyadic identity relation and \(\mathfrak{1}\) for the “antique figure one” that Peirce defines as \(\mathit{1}_\infty = \text{something}.\)

CP 3 gives \([\mathit{1}] = \mathfrak{1},\) which I cannot make sense of. CE 2 gives the 1's in different styles of italics, but reading the equation as \([\mathit{1}] = 1,\!\) makes the best sense if the “1” on the right hand side is read as the numeral “1” that denotes the natural number 1, and not as the absolute term “1” that denotes the universe of discourse. Read this way, \([\mathit{1}]\!\) is the average number of things related by the identity relation \(\mathit{1}\!\) to one individual, and so it makes sense that \([\mathit{1}] = 1 \in \mathbb{N},\) where \(\mathbb{N}\) is the set of non-negative integers \(\{ 0, 1, 2, \ldots \}.\)

With respect to the relative term \(^{\backprime\backprime} \mathit{1} ^{\prime\prime}\) in the syntactic domain \(S\!\) and the number \(1\!\) in the non-negative integers \(\mathbb{N} \subset \mathbb{R},\) we have:

\(v(\mathit{1}) ~=~ [\mathit{1}] ~=~ 1.\)

And so the “number of” mapping \(v : S \to \mathbb{R}\) has another one of the properties that would be required of an arrow \(S \to \mathbb{R}.\)

The manner in which these arrows and qualified arrows help us to construct a suspension bridge that unifies logic, semiotics, statistics, stochastics, and information theory will be one of the main themes I aim to elaborate throughout the rest of this inquiry.

Selection 12

The Sign of Involution

I shall take involution in such a sense that \(x^y\!\) will denote everything which is an \(x\!\) for every individual of \(y.\!\)  Thus \(\mathit{l}^\mathrm{w}\!\) will be a lover of every woman.  Then \((\mathit{s}^\mathit{l})^\mathrm{w}\!\) will denote whatever stands to every woman in the relation of servant of every lover of hers;  and \(\mathit{s}^{(\mathit{l}\mathrm{w})}\!\) will denote whatever is a servant of everything that is lover of a woman.  So that

\((\mathit{s}^\mathit{l})^\mathrm{w} ~=~ \mathit{s}^{(\mathit{l}\mathrm{w})}.\!\)

(Peirce, CP 3.77).

Commentary Note 12.1

To get a better sense of why the above formulas mean what they do, and to prepare the ground for understanding more complex relational expressions, it will help to assemble the following materials and definitions:

\(X\!\) is a set singled out in a particular discussion as the universe of discourse.
\(W \subseteq X\!\) is the 1-adic relation, or set, whose elements fall under the absolute term \(\mathrm{w} = \text{woman}.\!\) The elements of \(W\!\) are sometimes referred to as the denotation or the set-theoretic extension of the term \(\mathrm{w}.\!\)
\(L \subseteq X \times X\!\) is the 2-adic relation associated with the relative term \(\mathit{l} = \text{lover of}\,\underline{~~ ~~}.\!\)
\(S \subseteq X \times X\!\) is the 2-adic relation associated with the relative term \(\mathit{s} = \text{servant of}\,\underline{~~ ~~}.\!\)
\(\mathsf{W} = (\mathsf{W}_x) = \mathrm{Mat}(W) = \mathrm{Mat}(\mathrm{w})\) is the 1-dimensional matrix representation of the set \(W\!\) and the term \(\mathrm{w}.\!\)
\(\mathsf{L} = (\mathsf{L}_{xy}) = \mathrm{Mat}(L) = \mathrm{Mat}(\mathit{l})~\!\) is the 2-dimensional matrix representation of the relation \(L\!\) and the relative term \(\mathit{l}.\!\)
\(\mathsf{S} = (\mathsf{S}_{xy}) = \mathrm{Mat}(S) = \mathrm{Mat}(\mathit{s})\!\) is the 2-dimensional matrix representation of the relation \(S\!\) and the relative term \(\mathit{s}.~\!\)

Recalling a few definitions, the local flags of the relation \(L\!\) are given as follows:

\(\begin{array}{lll} u \star L & = & L_{u \,\text{at}\, 1} \\[6pt] & = & \{ (u, x) \in L \} \\[6pt] & = & \text{the ordered pairs in}~ L ~\text{that have}~ u ~\text{in the 1st place}. \\[9pt] L \star v & = & L_{v \,\text{at}\, 2} \\[6pt] & = & \{ (x, v) \in L \} \\[6pt] & = & \text{the ordered pairs in}~ L ~\text{that have}~ v ~\text{in the 2nd place}. \end{array}\!\)

The applications of the relation \(L\!\) are defined as follows:

\(\begin{array}{lll} u \cdot L & = & \mathrm{proj}_2 (u \star L) \\[6pt] & = & \{ x \in X : (u, x) \in L \} \\[6pt] & = & \text{loved by}~ u. \\[9pt] L \cdot v & = & \mathrm{proj}_1 (L \star v) \\[6pt] & = & \{ x \in X : (x, v) \in L \} \\[6pt] & = & \text{lover of}~ v. \end{array}\!\)

Commentary Note 12.2

Let us make a few preliminary observations about the operation of logical involution, as Peirce introduces it here:

I shall take involution in such a sense that \(x^y\!\) will denote everything which is an \(x\!\) for every individual of \(y.\!\)  Thus \(\mathit{l}^\mathrm{w}\!\) will be a lover of every woman.

(Peirce, CP 3.77).

In ordinary arithmetic the involution \(x^y,\!\) or the exponentiation of \(x\!\) to the power of \(y,\!\) is the repeated application of the multiplier \(x\!\) for as many times as there are ones making up the exponent \(y.\!\)

In analogous fashion, the logical involution \(\mathit{l}^\mathrm{w}\!\) is the repeated application of the term \(\mathit{l}\!\) for as many times as there are individuals under the term \(\mathrm{w}.\!\) According to Peirce's interpretive rules, the repeated applications of the base term \(\mathit{l}\!\) are distributed across the individuals of the exponent term \(\mathrm{w}.\!\) In particular, the base term \(\mathit{l}\!\) is not applied successively in the manner that would give something like “a lover of a lover of … a lover of a woman”.

For example, suppose that a universe of discourse numbers among its contents just three women, \(\mathrm{W}^{\prime}, \mathrm{W}^{\prime\prime}, \mathrm{W}^{\prime\prime\prime}.\) This could be expressed in Peirce's notation by writing:

\(\mathrm{w} ~=~ \mathrm{W}^{\prime} ~+\!\!,~ \mathrm{W}^{\prime\prime} ~+\!\!,~ \mathrm{W}^{\prime\prime\prime}\)

Under these circumstances the following equation would hold:

\(\mathit{l}^\mathrm{w} ~=~ \mathit{l}^{(\mathrm{W}^{\prime} ~+\!\!,~ \mathrm{W}^{\prime\prime} ~+\!\!,~ \mathrm{W}^{\prime\prime\prime})} ~=~ (\mathit{l}\mathrm{W}^{\prime}), (\mathit{l}\mathrm{W}^{\prime\prime}), (\mathit{l}\mathrm{W}^{\prime\prime\prime}).\)

This says that a lover of every woman in the given universe of discourse is a lover of \(\mathrm{W}^{\prime}\) that is a lover of \(\mathrm{W}^{\prime\prime}\) that is a lover of \(\mathrm{W}^{\prime\prime\prime}.\) In other words, a lover of every woman in this context is a lover of \(\mathrm{W}^{\prime}\) and a lover of \(\mathrm{W}^{\prime\prime}\) and a lover of \(\mathrm{W}^{\prime\prime\prime}.\)

The denotation of the term \(\mathit{l}^\mathrm{w}\!\) is a subset of \(X\!\) that can be obtained as follows: For each flag of the form \(L \star x\!\) with \(x \in W,\!\) collect the elements \(\mathrm{proj}_1 (L \star x)~\!\) that appear as the first components of these ordered pairs, and then take the intersection of all these subsets. Putting it all together:

\(\mathit{l}^\mathrm{w} ~=~ \bigcap_{x \in W} \mathrm{proj}_1 (L \star x) ~=~ \bigcap_{x \in W} L \cdot x\)

It is very instructive to examine the matrix representation of \(\mathit{l}^\mathrm{w}\!\) at this point, not the least because it effectively dispels the mystery of the name involution. First, let us make the following observation. To say that \(j\!\) is a lover of every woman is to say that \(j\!\) loves \(k\!\) if \(k\!\) is a woman. This can be rendered in symbols as follows:

\(j ~\text{loves}~ k ~\Leftarrow~ k ~\text{is a woman}\)

Reading the formula \(\mathit{l}^\mathrm{w}\!\) as “\(j\!\) loves \(k\!\) if \(k\!\) is a woman” highlights the operation of converse implication inherent in it, and this in turn reveals the analogy between implication and involution that accounts for the aptness of the latter name.

The operations defined by the formulas   \(x^y = z\!\)   and   \((x\!\Leftarrow\!y) = z\)   for \(x, y, z \in \mathbb{B} = \{ 0, 1 \}\) are tabulated below:

\( \begin{array}{ccc} x^y & = & z \\ \hline 0^0 & = & 1 \\ 0^1 & = & 0 \\ 1^0 & = & 1 \\ 1^1 & = & 1 \end{array} \qquad\qquad\qquad \begin{array}{ccc} x\!\Leftarrow\!y & = & z \\ \hline 0\!\Leftarrow\!0 & = & 1 \\ 0\!\Leftarrow\!1 & = & 0 \\ 1\!\Leftarrow\!0 & = & 1 \\ 1\!\Leftarrow\!1 & = & 1 \end{array} \)

It is clear that these operations are isomorphic, amounting to the same operation of type \(\mathbb{B} \times \mathbb{B} \to \mathbb{B}.\!\) All that remains is to see how this operation on coefficient values in \(\mathbb{B}\!\) induces the corresponding operations on sets and terms.

The term \(\mathit{l}^\mathrm{w}\!\) determines a selection of individuals from the universe of discourse \(X\!\) that may be computed by means of the corresponding operation on coefficient matrices. If the terms \(\mathit{l}\!\) and \(\mathrm{w}\!\) are represented by the matrices \(\mathsf{L} = \mathrm{Mat}(\mathit{l})\) and \(\mathsf{W} = \mathrm{Mat}(\mathrm{w}),\) respectively, then the operation on terms that produces the term \(\mathit{l}^\mathrm{w}\!\) must be represented by a corresponding operation on matrices, say, \(\mathsf{L}^\mathsf{W} = \mathrm{Mat}(\mathit{l})^{\mathrm{Mat}(\mathrm{w})},\) that produces the matrix \(\mathrm{Mat}(\mathit{l}^\mathrm{w}).\) In other words, the involution operation on matrices must be defined in such a way that the following equations hold:

\(\mathsf{L}^\mathsf{W} ~=~ \mathrm{Mat}(\mathit{l})^{\mathrm{Mat}(\mathrm{w})} ~=~ \mathrm{Mat}(\mathit{l}^\mathrm{w})\!\)

The fact that \(\mathit{l}^\mathrm{w}\!\) denotes the elements of a subset of \(X\!\) means that the matrix \(\mathsf{L}^\mathsf{W}\!\) is a 1-dimensional array of coefficients in \(\mathbb{B}\!\) that is indexed by the elements of \(X.\!\) The value of the matrix \(\mathsf{L}^\mathsf{W}\!\) at the index \({u \in X}\!\) is written \((\mathsf{L}^\mathsf{W})_u\!\) and computed as follows:

\((\mathsf{L}^\mathsf{W})_u ~=~ \prod_{v \in X} \mathsf{L}_{uv}^{\mathsf{W}_v}\!\)

Commentary Note 12.3

We now have two ways of computing a logical involution that raises a dyadic relative term to the power of a monadic absolute term, for example, \(\mathit{l}^\mathrm{w}\!\) for “lover of every woman”.

The first method operates in the medium of set theory, expressing the denotation of the term \(\mathit{l}^\mathrm{w}\!\) as the intersection of a set of relational applications:

\(\mathit{l}^\mathrm{w} ~=~ \bigcap_{x \in W} L \cdot x\!\)

The second method operates in the matrix representation, expressing the value of the matrix \(\mathsf{L}^\mathsf{W}\!\) with respect to an argument \(u\!\) as a product of coefficient powers:

\((\mathsf{L}^\mathsf{W})_u ~=~ \prod_{v \in X} \mathsf{L}_{uv}^{\mathsf{W}_v}\!\)

Abstract formulas like these are more easily grasped with the aid of a concrete example and a picture of the relations involved.

Example 6

Consider a universe of discourse \(X\!\) that is subject to the following data:

\(\begin{array}{*{15}{c}} X & = & \{ & a, & b, & c, & d, & e, & f, & g, & h, & i & \} \\[6pt] W & = & \{ & d, & f & \} \\[6pt] L & = & \{ & b\!:\!a, & b\!:\!c, & c\!:\!b, & c\!:\!d, & e\!:\!d, & e\!:\!e, & e\!:\!f, & g\!:\!f, & g\!:\!h, & h\!:\!g, & h\!:\!i & \} \end{array}\)

Figure 55 shows the placement of \(W\!\) within \(X\!\) and the placement of \(L\!\) within \(X \times X.\!\)

  File:LOR 1870 Figure 55.jpg (55)

To highlight the role of \(W\!\) more clearly, the Figure represents the absolute term \({}^{\backprime\backprime} \mathrm{w} {}^{\prime\prime}\!\) by means of the relative term \({}^{\backprime\backprime} \mathrm{w}, \! {}^{\prime\prime}\!\) that conveys the same information.

Computing the denotation of \(\mathit{l}^\mathrm{w}\!\) by way of the set-theoretic formula, we can show our work as follows:

\(\mathit{l}^\mathrm{w} ~=~ \bigcap_{x \in W} L \cdot x ~=~ L \cdot d ~\cap~ L \cdot f ~=~ \{ c, e \} \cap \{ e, g \} ~=~ \{ e \}\)

With the above Figure in mind, we can visualize the computation of \((\mathsf{L}^\mathsf{W})_u = \textstyle\prod_{v \in X} \mathsf{L}_{uv}^{\mathsf{W}_v}\!\) as follows:

1. Pick a specific \(u\!\) in the bottom row of the Figure.
2. Pan across the elements \(v\!\) in the middle row of the Figure.
3. If \(u\!\) links to \(v\!\) then \(\mathsf{L}_{uv} = 1,\!\) otherwise \({\mathsf{L}_{uv} = 0}.\!\)
4. If \(v\!\) in the middle row links to \(v\!\) in the top row then \(\mathsf{W}_v = 1,\!\) otherwise \(\mathsf{W}_v = 0.\!\)
5. Compute the value \(\mathsf{L}_{uv}^{\mathsf{W}_v} = (\mathsf{L}_{uv} \Leftarrow \mathsf{W}_v)\!\) for each \(v\!\) in the middle row.
6. If any of the values \(\mathsf{L}_{uv}^{\mathsf{W}_v}\!\) is \(0\!\) then the product \(\textstyle\prod_{v \in X} \mathsf{L}_{uv}^{\mathsf{W}_v}\!\) is \(0,\!\) otherwise it is \(1.\!\)

As a general observation, we know that the value of \((\mathsf{L}^\mathsf{W})_u\!\) goes to \(0~\!\) just as soon as we find a \(v \in X\!\) such that \(\mathsf{L}_{uv} = 0\!\) and \(\mathsf{W}_v = 1,\!\) in other words, such that \((u, v) \notin L\!\) but \(v \in W.\!\) If there is no such \(v\!\) then \((\mathsf{L}^\mathsf{W})_u = 1.\!\)

Running through the program for each \(u \in X,\!\) the only case that produces a non-zero result is \((\mathsf{L}^\mathsf{W})_e = 1.\!\) That portion of the work can be sketched as follows:

\((\mathsf{L}^\mathsf{W})_e ~=~ \prod_{v \in X} \mathsf{L}_{ev}^{\mathsf{W}_v} ~=~ 0^0 \cdot 0^0 \cdot 0^0 \cdot 1^1 \cdot 1^0 \cdot 1^1 \cdot 0^0 \cdot 0^0 \cdot 0^0 ~=~ 1\!\)

Commentary Note 12.4

Peirce next considers a pair of compound involutions, stating an equation between them that is analogous to a law of exponents in ordinary arithmetic, namely, \((a^b)^c = a^{bc}.\!\)

Then \((\mathit{s}^\mathit{l})^\mathrm{w}\!\) will denote whatever stands to every woman in the relation of servant of every lover of hers;  and \(\mathit{s}^{(\mathit{l}\mathrm{w})}\!\) will denote whatever is a servant of everything that is lover of a woman.  So that

\((\mathit{s}^\mathit{l})^\mathrm{w} ~=~ \mathit{s}^{(\mathit{l}\mathrm{w})}.\!\)

(Peirce, CP 3.77).

Articulating the compound relative term \(\mathit{s}^{(\mathit{l}\mathrm{w})}\!\) in set-theoretic terms is fairly immediate:

\(\mathit{s}^{(\mathit{l}\mathrm{w})} ~=~ \bigcap_{x \in LW} \mathrm{proj}_1 (S \star x) ~=~ \bigcap_{x \in LW} S \cdot x\!\)

On the other hand, translating the compound relative term \((\mathit{s}^\mathit{l})^\mathrm{w}\!\) into a set-theoretic equivalent is less immediate, the hang-up being that we have yet to define the case of logical involution that raises a dyadic relative term to the power of a dyadic relative term. As a result, it looks easier to proceed through the matrix representation, drawing once again on the inspection of a concrete example.

Example 7

\(\begin{array}{*{15}{c}} X & = & \{ & a, & b, & c, & d, & e, & f, & g, & h, & i\ & \} \\[6pt] L & = & \{ & b\!:\!a, & b\!:\!c, & c\!:\!b, & c\!:\!d, & e\!:\!d, & e\!:\!e, & e\!:\!f, & g\!:\!f, & g\!:\!h, & h\!:\!g, & h\!:\!i & \} \\[6pt] S & = & \{ & b\!:\!a, & b\!:\!c, & d\!:\!c, & d\!:\!d, & d\!:\!e, & f\!:\!e, & f\!:\!f, & f\!:\!g, & h\!:\!g, & h\!:\!i\ & \} \end{array}\)

  File:LOR 1870 Figure 56.jpg (56)

There is a “servant of every lover of” link between \(u\!\) and \(v\!\) if and only if \(u \cdot S ~\supseteq~ L \cdot v.\!\)  But the vacuous inclusions, that is, the cases where \(L \cdot v = \varnothing,\!\) have the effect of adding non-intuitive links to the mix.

The computational requirements are evidently met by the following formula:

\((\mathsf{S}^\mathsf{L})_{xy} ~=~ \prod_{p \in X} \mathsf{S}_{xp}^{\mathsf{L}_{py}}\!\)

In other words, \((\mathsf{S}^\mathsf{L})_{xy} = 0\!\) if and only if there exists a \({p \in X}\!\) such that \(\mathsf{S}_{xp} = 0\!\) and \(\mathsf{L}_{py} = 1.\!\)

Commentary Note 12.5

The equation \((\mathit{s}^\mathit{l})^\mathrm{w} = \mathit{s}^{\mathit{l}\mathrm{w}}\!\) can be verified by establishing the corresponding equation in matrices:

\((\mathsf{S}^\mathsf{L})^\mathsf{W} ~=~ \mathsf{S}^{\mathsf{L}\mathsf{W}}\)

If \(\mathsf{A}\) and \(\mathsf{B}\) are two 1-dimensional matrices over the same index set \(X\!\) then \(\mathsf{A} = \mathsf{B}\) if and only if \(\mathsf{A}_x = \mathsf{B}_x\) for every \(x \in X.\) Thus, a routine way to check the validity of \((\mathsf{S}^\mathsf{L})^\mathsf{W} = \mathsf{S}^{\mathsf{L}\mathsf{W}}\) is to check whether the following equation holds for arbitrary \(x \in X.\)

\(((\mathsf{S}^\mathsf{L})^\mathsf{W})_x ~=~ (\mathsf{S}^{\mathsf{L}\mathsf{W}})_x\)

Taking both ends toward the middle, we proceed as follows:

\( \begin{array}{*{7}{l}} ((\mathsf{S}^\mathsf{L})^\mathsf{W})_x & = & \displaystyle \prod_{p \in X} (\mathsf{S}^\mathsf{L})_{xp}^{\mathsf{W}_p} & = & \displaystyle \prod_{p \in X} (\prod_{q \in X} \mathsf{S}_{xq}^{\mathsf{L}_{qp}})^{\mathsf{W}_p} & = & \displaystyle \prod_{p \in X} \prod_{q \in X} \mathsf{S}_{xq}^{\mathsf{L}_{qp}\mathsf{W}_p} \\[36px] (\mathsf{S}^{\mathsf{L}\mathsf{W}})_x & = & \displaystyle \prod_{q \in X} \mathsf{S}_{xq}^{(\mathsf{L}\mathsf{W})_q} & = & \displaystyle \prod_{q \in X} \mathsf{S}_{xq}^{\sum_{p \in X} \mathsf{L}_{qp} \mathsf{W}_p} & = & \displaystyle \prod_{q \in X} \prod_{p \in X} \mathsf{S}_{xq}^{\mathsf{L}_{qp} \mathsf{W}_p} \end{array} \)

The products commute, so the equation holds. In essence, the matrix identity turns on the fact that the law of exponents \((a^b)^c = a^{bc}\!\) in ordinary arithmetic holds when the values \(a, b, c\!\) are restricted to the boolean domain \(\mathbb{B} = \{ 0, 1 \}.\) Interpreted as a logical statement, the law of exponents \((a^b)^c = a^{bc}\!\) amounts to a theorem of propositional calculus that is otherwise expressed in the following ways:

\(\begin{matrix} (a \,\Leftarrow\, b) \,\Leftarrow\, c & = & a \,\Leftarrow\, b \land c \\[8pt] (a >\!\!\!-~ b) >\!\!\!-~ c & = & a >\!\!\!-~ bc \\[8pt] c ~-\!\!\!< (b ~-\!\!\!< a) & = & cb ~-\!\!\!< a \\[8pt] c \,\Rightarrow\, (b \,\Rightarrow\, a) & = & c \land b \,\Rightarrow\, a \end{matrix}\)

Commentary Note 12.6

References

  • Boole, George (1854), An Investigation of the Laws of Thought, On Which are Founded the Mathematical Theories of Logic and Probabilities, Macmillan, 1854. Reprinted, Dover Publications, New York, NY, 1958.
  • Peirce, C.S. (1870), “Description of a Notation for the Logic of Relatives, Resulting from an Amplification of the Conceptions of Boole's Calculus of Logic”, Memoirs of the American Academy of Arts and Sciences 9, 317–378, 26 January 1870. Reprinted, Collected Papers (CP 3.45–149), Chronological Edition (CE 2, 359–429). Online (1) (2) (3).
  • Peirce, C.S., Collected Papers of Charles Sanders Peirce, vols. 1–6, Charles Hartshorne and Paul Weiss (eds.), vols. 7–8, Arthur W. Burks (ed.), Harvard University Press, Cambridge, MA, 1931–1935, 1958. Cited as (CP volume.paragraph).
  • Peirce, C.S., Writings of Charles S. Peirce : A Chronological Edition, Peirce Edition Project (eds.), Indiana University Press, Bloomington and Indianoplis, IN, 1981–. Cited as (CE volume, page).

Further Reading

  • Brady, G. (2000), From Peirce to Skolem : A Neglected Chapter in the History of Logic, Elsevier, Amsterdam. Online Preview.
  • Lambek, J., and Scott, P.J. (1986), Introduction to Higher Order Categorical Logic, Cambridge University Press, Cambridge, UK.
  • Mili, A., Desharnais, J., Mili, F., with Frappier, M. (1994), Computer Program Construction, Oxford University Press, New York, NY.
  • Walsh, A. (2012), Relations Between Logic and Mathematics in the Work of Benjamin and Charles S. Peirce, Docent Press, Boston, MA.

See Also

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