Modal and Intuitionistic Variants of Extended Belnap–Dunn Logic with Classical Negation

Journal of Logic, Language and Information 30 (3):491-531 (2021)
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Abstract

In this study, we introduce Gentzen-type sequent calculi BDm and BDi for a modal extension and an intuitionistic modification, respectively, of De and Omori’s extended Belnap–Dunn logic BD+ with classical negation. We prove theorems for syntactically and semantically embedding BDm and BDi into Gentzen-type sequent calculi S4 and LJ for normal modal logic and intuitionistic logic, respectively. The cut-elimination, decidability, and completeness theorems for BDm and BDi are obtained using these embedding theorems. Moreover, we prove the Glivenko theorem for embedding BD+ into BDi and the McKinsey–Tarski theorem for embedding BDi into BDm.

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10.1007/s10849-021-09330-1

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Citations of this work

Falsification-Aware Calculi and Semantics for Normal Modal Logics Including S4 and S5.Norihiro Kamide - 2023 - Journal of Logic, Language and Information 32 (3):395-440.
Improving Strong Negation.Satoru Niki - 2023 - Review of Symbolic Logic 16 (3):951-977.

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