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Deductive closure - Wikipedia

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In mathematical logic, a set ⁠ ${\mathcal {T}}$ ⁠ of logical formulae is deductively closed if it contains every formula ⁠ $\varphi$ ⁠ that can be logically deduced from ⁠ ${\mathcal {T}}$ ⁠, formally: if ⁠ ${\mathcal {T}}\vdash \varphi$ ⁠ always implies ⁠ $\varphi \in {\mathcal {T}}$ ⁠. If ⁠ $T$ ⁠ is a set of formulae, the deductive closure of ⁠ $T$ ⁠ is its smallest superset that is deductively closed.

The deductive closure of a theory ⁠ ${\mathcal {T}}$ ⁠ is often denoted ⁠ $\operatorname {Ded} ({\mathcal {T}})$ ⁠ or ⁠ $\operatorname {Th} ({\mathcal {T}})$ ⁠.^{[citation needed]} Some authors do not define a theory as deductively closed (thus, a theory is defined as any set of sentences), but such theories can always be 'extended' to a deductively closed set. A theory may be referred to as a deductively closed theory to emphasize it is defined as a deductively closed set.^[1]

Deductive closure is a special case of the more general mathematical concept of closure — in particular, the deductive closure of ⁠ ${\mathcal {T}}$ ⁠ is exactly the closure of ⁠ ${\mathcal {T}}$ ⁠ with respect to the operation of logical consequence (⁠ $\vdash$ ⁠).

Examples

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In propositional logic, the set of all true propositions is deductively closed. This is to say that only true statements are derivable from other true statements.

Epistemic closure

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Main article: Epistemic closure

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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^ First-order theory at PlanetMath.

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