Difference between revisions of "Continuous predicate"

MyWikiBiz, Author Your Legacy — Thursday December 26, 2024
Jump to navigationJump to search
(update)
 
(6 intermediate revisions by the same user not shown)
Line 1: Line 1:
 
<font size="3">&#9758;</font> This page belongs to resource collections on [[Logic Live|Logic]] and [[Inquiry Live|Inquiry]].
 
<font size="3">&#9758;</font> This page belongs to resource collections on [[Logic Live|Logic]] and [[Inquiry Live|Inquiry]].
  
A '''continuous predicate''', as described by [[Charles Sanders Peirce]], is a special type of [[relation (mathematics)|relation]]al [[predicate]] that arises as the [[limit (mathematics)|limit]] of an iterated process of [[hypostatic abstraction]].
+
A '''continuous predicate''', as described by Charles Sanders Peirce, is a special type of [[relation (mathematics)|relational predicate]] that arises as the limit of an iterated process of [[hypostatic abstraction]].
  
 
Here is one of Peirce's definitive discussions of the concept:
 
Here is one of Peirce's definitive discussions of the concept:
  
<blockquote>
+
<div style="margin-left:5em; margin-right:20em">
<p>When we have analyzed a proposition so as to throw into the subject everything that can be removed from the predicate, all that it remains for the predicate to represent is the form of connection between the different subjects as expressed in the propositional ''form''.  What I mean by "everything that can be removed from the predicate" is best explained by giving an example of something not so removable.</p>
 
  
<p>But first take something removable.  "Cain kills Abel."  Here the predicate appears as "&mdash; kills &mdash;."  But we can remove killing from the predicate and make the latter "&mdash; stands in the relation &mdash; to &mdash;."  Suppose we attempt to remove more from the predicate and put the last into the form "&mdash; exercises the function of relate of the relation &mdash; to &mdash;" and then putting "the function of relate to the relation" into another subject leave as predicate "&mdash; exercises &mdash; in respect to &mdash; to &mdash;."  But this "exercises" expresses "exercises the function".  Nay more, it expresses "exercises the function of relate", so that we find that though we may put this into a separate subject, it continues in the predicate just the same.</p>
+
When we have analyzed a proposition so as to throw into the subject everything that can be removed from the predicate, all that it remains for the predicate to represent is the form of connection between the different subjects as expressed in the propositional ''form''.&nbsp; What I mean by &ldquo;everything that can be removed from the predicate&rdquo; is best explained by giving an example of something not so removable.
  
<p>Stating this in another form, to say that "A is in the relation R to B" is to say that A is in a certain relation to R.  Let us separate this out thus:  "A is in the relation R<sup>1</sup> (where R<sup>1</sup> is the relation of a relate to the relation of which it is the relate) to R to B". But A is here said to be in a certain relation to the relation R<sup>1</sup>. So that we can express the same fact by saying, "A is in the relation R<sup>1</sup> to the relation R<sup>1</sup> to the relation R to B", and so on ''ad infinitum''.</p>
+
But first take something removable.&nbsp; &ldquo;Cain kills Abel.&rdquo;&nbsp; Here the predicate appears as &ldquo;&mdash; kills &mdash;.&rdquo;&nbsp; But&nbsp;we can remove killing from the predicate and make the latter &ldquo;&mdash; stands in the relation &mdash; to &mdash;.&rdquo;&nbsp; Suppose we attempt to remove more from the predicate and put the last into the form &ldquo;&mdash; exercises the function of relate of the relation &mdash; to &mdash;&rdquo; and then putting &ldquo;the function of relate to the relation&rdquo; into another subject leave as predicate &ldquo;&mdash; exercises &mdash; in respect to &mdash; to &mdash;.&rdquo;&nbsp; But&nbsp;this &ldquo;exercises&rdquo; expresses &ldquo;exercises the function&rdquo;.&nbsp; Nay more, it expresses &ldquo;exercises the function of relate&rdquo;, so that we find that though we may put this into a separate subject, it continues in the predicate just the same.
  
<p>A predicate which can thus be analyzed into parts all homogeneous with the whole I call a ''continuous predicate''. It is very important in logical analysis, because a continuous predicate obviously cannot be a ''compound'' except of continuous predicates, and thus when we have carried analysis so far as to leave only a continuous predicate, we have carried it to its ultimate elements. (C.S. Peirce, "Letters to Lady Welby" (14 December 1908), ''Selected Writings'', pp. 396&ndash;397).</p>
+
Stating this in another form, to say that &ldquo;A is in the relation R to B&rdquo; is to say that A is in a certain relation to R.&nbsp; Let us separate this out thus:&nbsp; &ldquo;A is in the relation R<sup>1</sup> (where R<sup>1</sup> is the relation of a relate to the relation of which it is the relate) to R to B&rdquo;.&nbsp; But&nbsp;A is here said to be in a certain relation to the relation R<sup>1</sup>.&nbsp; So that we can express the same fact by saying, &ldquo;A is in the relation R<sup>1</sup> to the relation R<sup>1</sup> to the relation R to B&rdquo;, and so on ''ad&nbsp;infinitum''.
</blockquote>
+
 
 +
A predicate which can thus be analyzed into parts all homogeneous with the whole I call a ''continuous predicate''.&nbsp; It is very important in logical analysis, because a continuous predicate obviously cannot be a ''compound'' except of continuous predicates, and thus when we have carried analysis so far as to leave only a continuous predicate, we have carried it to its ultimate elements.
 +
 
 +
(C.S. Peirce, &ldquo;Letters to Lady Welby&rdquo; (14 December 1908), ''Selected Writings'', pp.&nbsp;396&ndash;397).
 +
 
 +
</div>
  
 
==References==
 
==References==
  
* [[Charles Sanders Peirce|Peirce, C.S.]], "Letters to Lady Welby", pp. 380&ndash;432 in ''Charles S. Peirce : Selected Writings (Values in a Universe of Chance)'', [[Philip P. Wiener]] (ed.), Dover, New York, NY, 1966.
+
* [[Charles Sanders Peirce|Peirce, C.S.]], &ldquo;Letters to Lady Welby&rdquo;, pp.&nbsp;380&ndash;432 in ''Charles S. Peirce : Selected Writings (Values in a Universe of Chance)'', Philip P. Wiener (ed.), Dover&nbsp;Publications, New&nbsp;York, NY, 1966.
  
 
==Resources==
 
==Resources==
Line 27: Line 31:
 
===Focal nodes===
 
===Focal nodes===
  
{{col-begin}}
 
{{col-break}}
 
 
* [[Inquiry Live]]
 
* [[Inquiry Live]]
{{col-break}}
 
 
* [[Logic Live]]
 
* [[Logic Live]]
{{col-end}}
 
  
 
===Peer nodes===
 
===Peer nodes===
  
{{col-begin}}
+
* [http://intersci.ss.uci.edu/wiki/index.php/Continuous_predicate Continuous Predicate @ InterSciWiki]
{{col-break}}
 
 
* [http://mywikibiz.com/Continuous_predicate Continuous Predicate @ MyWikiBiz]
 
* [http://mywikibiz.com/Continuous_predicate Continuous Predicate @ MyWikiBiz]
* [http://mathweb.org/wiki/Continuous_predicate Continuous Predicate @ MathWeb Wiki]
+
* [http://ref.subwiki.org/wiki/Continuous_predicate Continuous Predicate @ Subject Wikis]
* [http://netknowledge.org/wiki/Continuous_predicate Continuous Predicate @ NetKnowledge]
+
* [http://en.wikiversity.org/wiki/Continuous_predicate Continuous Predicate @ Wikiversity]
{{col-break}}
+
* [http://beta.wikiversity.org/wiki/Continuous_predicate Continuous Predicate @ Wikiversity Beta]
* [http://wiki.oercommons.org/mediawiki/index.php/Continuous_predicate Continuous Predicate @ OER Commons]
 
* [http://p2pfoundation.net/Continuous_Predicate Continuous Predicate @ P2P Foundation]
 
* [http://semanticweb.org/wiki/Continuous_predicate Continuous Predicate @ SemanticWeb]
 
{{col-end}}
 
  
 
===Logical operators===
 
===Logical operators===
Line 110: Line 105:
 
{{col-break}}
 
{{col-break}}
 
* [[Inquiry]]
 
* [[Inquiry]]
 +
* [[Dynamics of inquiry]]
 +
{{col-break}}
 +
* [[Semeiotic]]
 
* [[Logic of information]]
 
* [[Logic of information]]
 
{{col-break}}
 
{{col-break}}
Line 116: Line 114:
 
{{col-break}}
 
{{col-break}}
 
* [[Pragmatic maxim]]
 
* [[Pragmatic maxim]]
* [[Pragmatic theory of truth]]
+
* [[Truth theory]]
{{col-break}}
 
* [[Semeiotic]]
 
* [[Semiotic information]]
 
 
{{col-end}}
 
{{col-end}}
  
 
===Related articles===
 
===Related articles===
  
* [http://mywikibiz.com/Directory:Jon_Awbrey/Papers/Introduction_to_Inquiry_Driven_Systems Jon Awbrey, &ldquo;Introduction To Inquiry Driven Systems&rdquo;]
+
{{col-begin}}
 
+
{{col-break}}
* [http://mywikibiz.com/Directory:Jon_Awbrey/Essays/Prospects_For_Inquiry_Driven_Systems Jon Awbrey, &ldquo;Prospects For Inquiry Driven Systems&rdquo;]
+
* [http://intersci.ss.uci.edu/wiki/index.php/Cactus_Language Cactus Language]
 
+
* [http://intersci.ss.uci.edu/wiki/index.php/Futures_Of_Logical_Graphs Futures Of Logical Graphs]
* [http://mywikibiz.com/Directory:Jon_Awbrey/Papers/Inquiry_Driven_Systems Jon Awbrey, &ldquo;Inquiry Driven Systems : Inquiry Into Inquiry&rdquo;]
+
* [http://intersci.ss.uci.edu/wiki/index.php/Propositional_Equation_Reasoning_Systems Propositional Equation Reasoning Systems]
 
+
{{col-break}}
* [http://mywikibiz.com/Directory:Jon_Awbrey/Papers/Propositional_Equation_Reasoning_Systems Jon Awbrey, &ldquo;Propositional Equation Reasoning Systems&rdquo;]
+
* [http://intersci.ss.uci.edu/wiki/index.php/Differential_Logic_:_Introduction Differential Logic : Introduction]
 
+
* [http://intersci.ss.uci.edu/wiki/index.php/Differential_Propositional_Calculus Differential Propositional Calculus]
* [http://mywikibiz.com/Directory:Jon_Awbrey/Papers/Differential_Logic_:_Introduction Jon Awbrey, &ldquo;Differential Logic : Introduction&rdquo;]
+
* [http://intersci.ss.uci.edu/wiki/index.php/Differential_Logic_and_Dynamic_Systems_2.0 Differential Logic and Dynamic Systems]
 
+
{{col-break}}
* [http://planetmath.org/encyclopedia/DifferentialPropositionalCalculus.html Jon Awbrey, &ldquo;Differential Propositional Calculus&rdquo;]
+
* [http://intersci.ss.uci.edu/wiki/index.php/Introduction_to_Inquiry_Driven_Systems Introduction to Inquiry Driven Systems]
 
+
* [http://intersci.ss.uci.edu/wiki/index.php/Prospects_for_Inquiry_Driven_Systems Prospects for Inquiry Driven Systems]
* [http://mywikibiz.com/Directory:Jon_Awbrey/Papers/Differential_Logic_and_Dynamic_Systems_2.0 Jon Awbrey, &ldquo;Differential Logic and Dynamic Systems&rdquo;]
+
* [http://intersci.ss.uci.edu/wiki/index.php/Inquiry_Driven_Systems Inquiry Driven Systems : Inquiry Into Inquiry]
 +
{{col-end}}
  
 
==Document history==
 
==Document history==
Line 142: Line 138:
 
Portions of the above article were adapted from the following sources under the [[GNU Free Documentation License]], under other applicable licenses, or by permission of the copyright holders.
 
Portions of the above article were adapted from the following sources under the [[GNU Free Documentation License]], under other applicable licenses, or by permission of the copyright holders.
  
{{col-begin}}
+
* [http://intersci.ss.uci.edu/wiki/index.php/Continuous_predicate Continuous Predicate], [http://intersci.ss.uci.edu/ InterSciWiki]
{{col-break}}
 
 
* [http://mywikibiz.com/Continuous_predicate Continuous Predicate], [http://mywikibiz.com/ MyWikiBiz]
 
* [http://mywikibiz.com/Continuous_predicate Continuous Predicate], [http://mywikibiz.com/ MyWikiBiz]
* [http://beta.wikiversity.org/wiki/Continuous_predicate Continuous Predicate], [http://beta.wikiversity.org/ Wikiversity Beta]
+
* [http://planetmath.org/ContinuousPredicate Continuous Predicate], [http://planetmath.org/ PlanetMath]
* [http://netknowledge.org/wiki/Continuous_predicate Continuous Predicate], [http://netknowledge.org/ NetKnowledge]
 
* [http://planetmath.org/encyclopedia/ContinuousPredicate.html Continuous Predicate], [http://planetmath.org/ PlanetMath]
 
 
* [http://semanticweb.org/wiki/Continuous_predicate Continuous Predicate], [http://semanticweb.org/ SemanticWeb]
 
* [http://semanticweb.org/wiki/Continuous_predicate Continuous Predicate], [http://semanticweb.org/ SemanticWeb]
{{col-break}}
 
 
* [http://vectors.usc.edu/thoughtmesh/publish/147.php Continuous Predicate], [http://vectors.usc.edu/thoughtmesh/ ThoughtMesh]
 
* [http://vectors.usc.edu/thoughtmesh/publish/147.php Continuous Predicate], [http://vectors.usc.edu/thoughtmesh/ ThoughtMesh]
* [http://getwiki.net/-Continuous_Predicate Continuous Predicate], [http://getwiki.net/ GetWiki]
+
* [http://wikinfo.org/w/index.php?title=Continuous_predicate Continuous Predicate], [http://wikinfo.org/w/ Wikinfo]
* [http://wikinfo.org/index.php?title=Continuous_predicate Continuous Predicate], [http://wikinfo.org/ Wikinfo]
+
* [http://en.wikiversity.org/wiki/Continuous_predicate Continuous Predicate], [http://en.wikiversity.org/ Wikiversity]
* [http://textop.org/wiki/index.php?title=Continuous_predicate Continuous Predicate], [http://textop.org/wiki/ Textop Wiki]
+
* [http://beta.wikiversity.org/wiki/Continuous_predicate Continuous Predicate], [http://beta.wikiversity.org/ Wikiversity Beta]
 
* [http://en.wikipedia.org/w/index.php?title=Continuous_predicate&oldid=96870273 Continuous Predicate], [http://en.wikipedia.org/ Wikipedia]
 
* [http://en.wikipedia.org/w/index.php?title=Continuous_predicate&oldid=96870273 Continuous Predicate], [http://en.wikipedia.org/ Wikipedia]
{{col-end}}
 
 
<br><sharethis />
 
  
 +
[[Category:Charles Sanders Peirce]]
 
[[Category:Inquiry]]
 
[[Category:Inquiry]]
[[Category:Open Educational Resource]]
 
[[Category:Peer Educational Resource]]
 
[[Category:Computer Science]]
 
[[Category:Linguistics]]
 
 
[[Category:Logic]]
 
[[Category:Logic]]
 
[[Category:Mathematics]]
 
[[Category:Mathematics]]
 +
[[Category:Ontology]]
 
[[Category:Philosophy]]
 
[[Category:Philosophy]]
 +
[[Category:Pragmatism]]
 
[[Category:Semiotics]]
 
[[Category:Semiotics]]

Latest revision as of 04:08, 10 November 2015

This page belongs to resource collections on Logic and Inquiry.

A continuous predicate, as described by Charles Sanders Peirce, is a special type of relational predicate that arises as the limit of an iterated process of hypostatic abstraction.

Here is one of Peirce's definitive discussions of the concept:

When we have analyzed a proposition so as to throw into the subject everything that can be removed from the predicate, all that it remains for the predicate to represent is the form of connection between the different subjects as expressed in the propositional form.  What I mean by “everything that can be removed from the predicate” is best explained by giving an example of something not so removable.

But first take something removable.  “Cain kills Abel.”  Here the predicate appears as “— kills —.”  But we can remove killing from the predicate and make the latter “— stands in the relation — to —.”  Suppose we attempt to remove more from the predicate and put the last into the form “— exercises the function of relate of the relation — to —” and then putting “the function of relate to the relation” into another subject leave as predicate “— exercises — in respect to — to —.”  But this “exercises” expresses “exercises the function”.  Nay more, it expresses “exercises the function of relate”, so that we find that though we may put this into a separate subject, it continues in the predicate just the same.

Stating this in another form, to say that “A is in the relation R to B” is to say that A is in a certain relation to R.  Let us separate this out thus:  “A is in the relation R1 (where R1 is the relation of a relate to the relation of which it is the relate) to R to B”.  But A is here said to be in a certain relation to the relation R1.  So that we can express the same fact by saying, “A is in the relation R1 to the relation R1 to the relation R to B”, and so on ad infinitum.

A predicate which can thus be analyzed into parts all homogeneous with the whole I call a continuous predicate.  It is very important in logical analysis, because a continuous predicate obviously cannot be a compound except of continuous predicates, and thus when we have carried analysis so far as to leave only a continuous predicate, we have carried it to its ultimate elements.

(C.S. Peirce, “Letters to Lady Welby” (14 December 1908), Selected Writings, pp. 396–397).

References

  • Peirce, C.S., “Letters to Lady Welby”, pp. 380–432 in Charles S. Peirce : Selected Writings (Values in a Universe of Chance), Philip P. Wiener (ed.), Dover Publications, New York, NY, 1966.

Resources

Syllabus

Focal nodes

Peer nodes

Logical operators

Template:Col-breakTemplate:Col-breakTemplate:Col-end

Related topics

Template:Col-breakTemplate:Col-breakTemplate:Col-breakTemplate:Col-end

Relational concepts

Template:Col-breakTemplate:Col-breakTemplate:Col-breakTemplate:Col-end

Information, Inquiry

Template:Col-breakTemplate:Col-breakTemplate:Col-breakTemplate:Col-breakTemplate:Col-end

Related articles

Template:Col-breakTemplate:Col-breakTemplate:Col-breakTemplate:Col-end

Document history

Portions of the above article were adapted from the following sources under the GNU Free Documentation License, under other applicable licenses, or by permission of the copyright holders.