Automatic sequence: Difference between revisions

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{{Other uses|Closure (disambiguation){{!}}Closure}}
 
'''Deductive closure''' is a [[property (philosophy)|property]] of a [[set (mathematics)|set]] of [[object (philosophy)|objects]] (usually the objects in question are [[statement (logic)|statement]]s). A [[set (mathematics)|set]] of objects, <var>O</var>, is said to exhibit ''closure'' or to be ''closed'' under a given [[closure operator|operation]], <var>R</var>, provided that for every object, <var>x</var>, if <var>x</var> is a member of <var>O</var> and <var>x</var> is <var>R</var>-related to any object, <var>y</var>, then <var>y</var> is a member of <var>O</var>.<ref>[[Peter D. Klein]], ''Closure'', ''[[The Cambridge Dictionary of Philosophy]] (second edition)</ref> In the context of statements, a deductive closure is the set of all the statements that can be [[Deductive reasoning|deduced]] from a given set of statements.
 
In [[propositional calculus|propositional logic]], the set of all true propositions exhibits '''deductive closure''': if set <var>O</var> is the set of true propositions, and operation <var>R</var> is [[logical consequence]] (“<math>\vdash</math>”), then provided that proposition <var>p</var> is a member of <var>O</var> and <var>p</var> is <var>R</var>-related to <var>q</var> (i.e., p&nbsp;<math>\vdash</math>&nbsp;q), <var>q</var> is also a member of <var>O</var>.
 
== Epistemic closure ==
{{main|Epistemic closure}}
 
In [[epistemology]], many philosophers have and continue to debate whether particular subsets of [[proposition]]s—especially ones ascribing [[knowledge]] or [[Theory of justification|justification]] of a [[belief]] to a subject—are closed under deduction.
 
==References==
{{reflist}}
 
[[Category:Concepts in logic]]
[[Category:Deductive reasoning|Closure]]
[[Category:Logical consequence]]
[[Category:Propositional calculus]]
[[Category:Set theory]]

Revision as of 10:32, 22 April 2013

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Deductive closure is a property of a set of objects (usually the objects in question are statements). A set of objects, O, is said to exhibit closure or to be closed under a given operation, R, provided that for every object, x, if x is a member of O and x is R-related to any object, y, then y is a member of O.[1] In the context of statements, a deductive closure is the set of all the statements that can be deduced from a given set of statements.

In propositional logic, the set of all true propositions exhibits deductive closure: if set O is the set of true propositions, and operation R is logical consequence (“”), then provided that proposition p is a member of O and p is R-related to q (i.e., p  q), q is also a member of O.

Epistemic closure

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In epistemology, many philosophers have and continue to debate whether particular subsets of propositions—especially ones ascribing knowledge or justification of a belief to a subject—are closed under deduction.

References

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