Syntactic cut-elimination for common knowledge

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Annals of Pure and Applied Logic 160 (1):82-95 (2009)
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Abstract

We first look at an existing infinitary sequent system for common knowledge for which there is no known syntactic cut-elimination procedure and also no known non-trivial bound on the proof-depth. We then present another infinitary sequent system based on nested sequents that are essentially trees and with inference rules that apply deeply inside these trees. Thus we call this system “deep” while we call the former system “shallow”. In contrast to the shallow system, the deep system allows one to give a straightforward syntactic cut-elimination procedure. Since both systems can be embedded into each other, this also yields a syntactic cut-elimination procedure for the shallow system. For both systems we thus obtain an upper bound of φ20 on the depth of proofs, where φ is the Veblen function.

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10.1016/j.apal.2009.01.014

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Citations of this work

Justifications for common knowledge.Samuel Bucheli, Roman Kuznets & Thomas Studer - 2011 - Journal of Applied Non-Classical Logics 21 (1):35-60.
On the Proof Theory of Infinitary Modal Logic.Matteo Tesi - 2022 - Studia Logica 110 (6):1349-1380.

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References found in this work

Deep sequent systems for modal logic.Kai Brünnler - 2009 - Archive for Mathematical Logic 48 (6):551-577.
Cut-free sequent calculi for some tense logics.Ryo Kashima - 1994 - Studia Logica 53 (1):119 - 135.
Subsystems of set theory and second order number theory.Wolfram Pohlers - 1998 - In Samuel R. Buss, Handbook of proof theory. New York: Elsevier. pp. 137--209.
About cut elimination for logics of common knowledge.Luca Alberucci & Gerhard Jäger - 2005 - Annals of Pure and Applied Logic 133 (1):73-99.

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