An Analytic Calculus for the Intuitionistic Logic of Proofs

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Notre Dame Journal of Formal Logic 60 (3):353-393 (2019)
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Abstract

The goal of this article is to take a step toward the resolution of the problem of finding an analytic sequent calculus for the logic of proofs. For this, we focus on the system Ilp, the intuitionistic version of the logic of proofs. First we present the sequent calculus Gilp that is sound and complete with respect to the system Ilp; we prove that Gilp is cut-free and contraction-free, but it still does not enjoy the subformula property. Then, we enrich the language of the logic of proofs and we formulate in this language a second Gentzen calculus Gilp∗. We show that Gilp∗ is a conservative extension of Gilp, and that Gilp∗ satisfies the subformula property.

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10.1215/00294527-2019-0008

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Explicit provability and constructive semantics.Sergei N. Artemov - 2001 - Bulletin of Symbolic Logic 7 (1):1-36.
The method of hypersequents in the proof theory of propositional non-classical logics.Arnon Avron - 1977 - In Wilfrid Hodges (ed.), Logic. New York: Penguin Books. pp. 1-32.
Proof internalization in generalized Frege systems for classical logic.Yury Savateev - 2014 - Annals of Pure and Applied Logic 165 (1):340-356.

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