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A completeness theorem for continuous predicate modal logic
Archive for Mathematical Logic 58 (1-2):183-201 (2019)
Abstract
We study a modal extension of the Continuous First-Order Logic of Ben Yaacov and Pedersen :168–190, 2010). We provide a set of axioms for such an extension. Deduction rules are just Modus Ponens and Necessitation. We prove that our system is sound with respect to a Kripke semantics and, building on Ben Yaacov and Pedersen, that it satisfies a number of properties similar to those of first-order predicate logic. Then, by means of a canonical model construction, we get that every consistent set of formulas is satisfiable. From the latter result we derive an Approximated Strong Completeness Theorem, in the vein of Continuous Logic, and a Compactness Theorem.Other Versions
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Citations of this work
Continuous Accessibility Modal Logics.Caleb Camrud & Ranpal Dosanjh - 2022 - Journal of Philosophical Logic 52 (1):221-266.
References found in this work
A New Introduction to Modal Logic.M. J. Cresswell & G. E. Hughes - 1996 - New York: Routledge. Edited by M. J. Cresswell.
A proof of completeness for continuous first-order logic.Itaï Ben Yaacov & Arthur Paul Pedersen - 2010 - Journal of Symbolic Logic 75 (1):168-190.
G. E. Hughes & M. J. Cresswell, A New Introduction to Modal Logic. [REVIEW]Paolo Crivelli & Timothy Williamson - 1998 - Philosophical Review 107 (3):471.
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