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A Hypersequent Solution to the Inferentialist Problem of Modality
Erkenntnis 87 (4):1605-1633 (2022)
Abstract
The standard inferentialist approaches to modal logic tend to suffer from not being able to uniquely characterize the modal operators, require that introduction and elimination rules be interdefined, or rely on the introduction of possible-world like indexes into the object language itself. In this paper I introduce a hypersequent calculus that is flexible enough to capture many of the standard modal logics and does not suffer from the above problems. It is therefore an ideal candidate to underwrite an inferentialist theory of meaning for modal operators. Here I treat specifically the modal logics K, D, T, S4, B, and S5. I show that the calculi are adequate for each set of models, and show that they meet a large set of criteria that are generally thought necessary for a calculus to underwrite a theory of meaning.Author's Profile
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Citations of this work
Logical Multilateralism.Heinrich Wansing & Sara Ayhan - 2023 - Journal of Philosophical Logic 52 (6):1603-1636.
The Laws of Thought and the Laws of Truth as Two Sides of One Coin.Ulf Hlobil - 2022 - Journal of Philosophical Logic 52 (1):313-343.
Fractional-Valued Modal Logic.Mario Piazza, Gabriele Pulcini & Matteo Tesi - 2023 - Review of Symbolic Logic 16 (4):1033-1052.
Cut-free completeness for modular hypersequent calculi for modal logics K, T, and D.Samara Burns & Richard Zach - 2021 - Review of Symbolic Logic 14 (4):910-929.
References found in this work
The logical basis of metaphysics.Michael Dummett - 1991 - Cambridge, Mass.: Harvard University Press.
The collected papers of Gerhard Gentzen.Gerhard Gentzen - 1969 - Amsterdam,: North-Holland Pub. Co.. Edited by M. E. Szabo.
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