Changes

Directory:Jon Awbrey/Papers/Inquiry Driven Systems : Part 6 (view source)

Revision as of 03:34, 11 November 2012

117 bytes added , 03:34, 11 November 2012

→‎6.27. Differential Logic and Group Operations

Line 7,803: Line 7,803:

===6.27. Differential Logic and Group Operations===

−

~~<pre>~~

+

This section isolates the group-theoretic content of the previous series of Tables, using it to illustrate the following principle: When a geometric object, like a graph or digraph, is given an intensional representation (IR) in terms of a set of logical properties or propositional features, then many of the transformational aspects of that object can be represented in the ''differential extension'' of that IR.

−

This section isolates the group theoretic content of the previous series of Tables, using it to illustrate the following principle: When a geometric object, like a graph or digraph, is given an IR in terms of a set of logical properties or propositional features, then many of the transformational aspects of that object can be represented in the "differential extension~~" (DEX)~~ of that IR.

−

One approach to the study of a temporal system ~~(TS)~~ is through the paradigm/ principle of "sequential inference~~" (SI)~~.

+

One approach to the study of a temporal system is through the paradigm or principle of ''sequential inference''.

−

Principle of "sequential inference~~" (SI)~~. ~~An SI~~ rule is operative in any setting where the following list of ingredients can be identified.

+

Principle of ''sequential inference''. A sequential inference rule is operative in any setting where the following list of ingredients can be identified.

−

1. There is a frame of observation that affords, ~~determines~~, or ~~arranges for~~ a sequence of observations on a system.

+

# There is a frame of observation that affords, arranges for, or determines a sequence of observations on a system.

+

# There is an observable property or a logical feature <math>x\!</math> that can be true or false of the system at any given moment <math>t\!</math> of observation.

+

# There is a pair <math>(t, t')\!</math> of succeeding moments of observation.

−

~~2. There is an observable property or logical feature x that can be true or false~~ of the ~~system at any given moment t~~ of ~~observation~~.

+

Relative to a setting of this kind, the rules of sequential inference are exemplified by the schematism shown in Table 41.

−

~~3. There is a pair~~ <~~t, t'~~> ~~of succeeding moments of observation.~~

+

<br>

−

~~Relative to a setting of this kind, the rules of SI are exemplified by the schematism shown in Table 41.~~

+

<pre>

Table 41. Schematism of Sequential Inference

Initial Differential Inferred

Line 7,825: Line 7,825:

(x) @ t dx @ t x @ t'

(x) @ t (dx) @ t (x) @ t'

+

</pre>

+

<pre>

It may be thought that a notion of real time (t C R) is needed at this point to fund the account of sequential processes. From a logical point of view, however, I think it will be found that it is precisely out of such data that the notion of time has to be constructed.

Jon Awbrey

12,080

edits