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Directory:Jon Awbrey/Papers/Peirce's 1870 Logic Of Relatives (view source)
Revision as of 12:22, 8 April 2009
, 12:22, 8 April 2009→Commentary Note 9.5
One way to represent sets in the bigraph picture is simply to mark the nodes in some way, like so:
One way to represent sets in the bigraph picture is simply to mark the nodes in some way, like so:
{| align="center" cellspacing="6" width="90%"
| align="center" |
<pre>
<pre>
B C D E I J O
B C D E I J O
w + o + + o o o
w + o + + o o o
</pre>
</pre>
|}
Diagonal extensions of the absolute terms:
Diagonal extensions of the absolute terms:
Cast into the bigraph picture of 2-adic relations, the diagonal extension of an absolute term takes on a very distinctive sort of ''straight-laced'' character:
Cast into the bigraph picture of 2-adic relations, the diagonal extension of an absolute term takes on a very distinctive sort of ''straight-laced'' character:
{| align="center" cellspacing="6" width="90%"
| align="center" |
<pre>
<pre>
B C D E I J O
B C D E I J O
B C D E I J O
B C D E I J O
</pre>
</pre>
|}
{| align="center" cellspacing="6" width="90%"
| align="center" |
<pre>
<pre>
B C D E I J O
B C D E I J O
B C D E I J O
B C D E I J O
</pre>
</pre>
|}
{| align="center" cellspacing="6" width="90%"
| align="center" |
<pre>
<pre>
B C D E I J O
B C D E I J O
B C D E I J O
B C D E I J O
</pre>
</pre>
|}
{| align="center" cellspacing="6" width="90%"
| align="center" |
<pre>
<pre>
B C D E I J O
B C D E I J O
B C D E I J O
B C D E I J O
</pre>
</pre>
|}
===Commentary Note 9.6===
===Commentary Note 9.6===