Axiomatization of Crisp Gödel Modal Logic

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Studia Logica 109 (2):367-395 (2020)
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Abstract

In this paper we consider the modal logic with both \ and \ arising from Kripke models with a crisp accessibility and whose propositions are valued over the standard Gödel algebra \. We provide an axiomatic system extending the one from Caicedo and Rodriguez :37–55, 2015) for models with a valued accessibility with Dunn axiom from positive modal logics, and show it is strongly complete with respect to the intended semantics. The axiomatizations of the most usual frame restrictions are given too. We also prove that in the studied logic it is not possible to get \ as an abbreviation of \, nor vice-versa, showing that indeed the axiomatic system we present does not coincide with any of the mono-modal fragments previously axiomatized in the literature.

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2021

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10.1007/s11225-020-09910-5

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Author's Profile

Ricardo Oscar Rodriguez
Universidad de Buenos Aires (UBA)

Citations of this work

Fuzzy logic.Petr Hajek - 2008 - Stanford Encyclopedia of Philosophy.
Cyclic Elements in MV‐Algebras and Post Algebras.Antoni Torrens - 1994 - Mathematical Logic Quarterly 40 (4):431-444.

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