Crisp bi-G\"odel modal logic and its paraconsistent expansion

Abstract

In this paper, we provide a Hilbert-style axiomatisation for the crisp bi-G\"odel modal logic . We prove its completeness w.r.t.\ crisp Kripke models where formulas at each state are evaluated over the standard bi-G\"odel algebra on [0,1]. We also consider a paraconsistent expansion of with a De Morgan negation which we dub . We devise a Hilbert-style calculus for this logic and, as a~con\-se\-quence of a~conservative translation from to , prove its completeness w.r.t.\ crisp Kripke models with two valuations over [0,1] connected via . For these two logics, we establish that their decidability and validity are PSPACE-complete. We also study the semantical properties of and . In particular, we show that Glivenko theorem holds only in finitely branching frames. We also explore the classes of formulas that define the same classes of frames both in K (the classical modal logic) and the crisp G\"odel modal logic c. We show that, among others, all Sahlqvist formulas and all formulas φ→ where φ and are monotone, define the same classes of frames in K and c.

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