Hyperintensional models for non-congruential modal logics

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Logic Journal of the IGPL (forthcoming)
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Abstract

In this work, we illustrate applications of a semantic framework for non-congruential modal logic based on hyperintensional models. We start by discussing some philosophical ideas behind the approach; in particular, the difference between the set of possible worlds in which a formula is true (its intension) and the semantic content of a formula (its hyperintension), which is captured in a rigorous way in hyperintensional models. Next, we rigorously specify the approach and provide a fundamental completeness theorem. Moreover, we analyse examples of non-congruential systems that can be semantically characterized within this framework in an elegant and modular way. Finally, we compare the proposed framework with some alternatives available in the literature. In the light of the results obtained, we argue that hyperintensional models constitute a basic, general and unifying semantic framework for (non-congruential) modal logic.

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10.1093/jigpal/jzad018

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Author Profiles

Matteo Pascucci
Slovak Academy of Sciences
Igor Sedlár
Czech Academy of Sciences

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References found in this work

Modal Logic.Patrick Blackburn, Maarten de Rijke & Yde Venema - 2001 - Studia Logica 76 (1):142-148.
I. deontic logic.G. H. von Wright - 1951 - Mind 60 (237):1-15.
Symbolic Logic.C. I. Lewis & C. H. Langford - 1932 - Erkenntnis 4 (1):65-66.
Belief, awareness, and limited reasoning.Ronald Fagin & Joseph Y. Halpern - 1987 - Artificial Intelligence 34 (1):39-76.
Hyperintensional logic.M. J. Cresswell - 1975 - Studia Logica 34 (1):25 - 38.

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