Tautology Elimination, Cut Elimination, and S5

Logic and Logical Philosophy 26 (4):461-471 (2017)
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Abstract

Tautology elimination rule was successfully applied in automated deduction and recently considered in the framework of sequent calculi where it is provably equivalent to cut rule. In this paper we focus on the advantages of proving admissibility of tautology elimination rule instead of cut for sequent calculi. It seems that one may find simpler proofs of admissibility for tautology elimination than for cut admissibility. Moreover, one may prove its admissibility for some calculi where constructive proofs of cut admissibility fail. As an illustration we present a cut-free sequent calculus for S5 based on tableau system of Fitting and prove admissibility of tautology elimination rule for it.

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10.12775/llp.2017.005

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Citations of this work

The Logicality of Equality.Andrzej Indrzejczak - 2024 - In Thomas Piecha & Kai F. Wehmeier (eds.), Peter Schroeder-Heister on Proof-Theoretic Semantics. Springer. pp. 211-238.

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References found in this work

Cut Elimination for GLS Using the Terminability of its Regress Process.Jude Brighton - 2016 - Journal of Philosophical Logic 45 (2):147-153.
A simple propositional S5 tableau system.Melvin Fitting - 1999 - Annals of Pure and Applied Logic 96 (1-3):107-115.

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