Semantic Completeness of First-Order Theories in Constructive Reverse Mathematics

Notre Dame Journal of Formal Logic 57 (2):281-286 (2016)
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Abstract

We introduce a general notion of semantic structure for first-order theories, covering a variety of constructions such as Tarski and Kripke semantics, and prove that, over Zermelo–Fraenkel set theory, the completeness of such semantics is equivalent to the Boolean prime ideal theorem. Using a result of McCarty, we conclude that the completeness of Kripke semantics is equivalent, over intuitionistic Zermelo–Fraenkel set theory, to the Law of Excluded Middle plus BPI. Along the way, we also prove the equivalence, over ZF, between BPI and the completeness theorem for Kripke semantics for both first-order and propositional theories.

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10.1215/00294527-3470433

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References found in this work

On weak completeness of intuitionistic predicate logic.G. Kreisel - 1962 - Journal of Symbolic Logic 27 (2):139-158.
Completeness and incompleteness for intuitionistic logic.Charles Mccarty - 2008 - Journal of Symbolic Logic 73 (4):1315-1327.
Intuitionistic Completeness and Classical Logic.D. C. McCarty - 2002 - Notre Dame Journal of Formal Logic 43 (4):243-248.
On Theorems of Gödel and Kreisel: Completeness and Markov's Principle.D. C. McCarty - 1994 - Notre Dame Journal of Formal Logic 35 (1):99-107.
Reflexive Intermediate Propositional Logics.Nathan C. Carter - 2006 - Notre Dame Journal of Formal Logic 47 (1):39-62.

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