Computing interpolants in implicational logics

Annals of Pure and Applied Logic 142 (1):125-201 (2006)
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Abstract

I present a new syntactical method for proving the Interpolation Theorem for the implicational fragment of intuitionistic logic and its substructural subsystems. This method, like Prawitz’s, works on natural deductions rather than sequent derivations, and, unlike existing methods, always finds a ‘strongest’ interpolant under a certain restricted but reasonable notion of what counts as an ‘interpolant’

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10.1016/j.apal.2005.12.014

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Citations of this work

On the Recognizing Power of the Lambek Calculus with Brackets.Makoto Kanazawa - 2018 - Journal of Logic, Language and Information 27 (4):295-312.

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References found in this work

Natural deduction: a proof-theoretical study.Dag Prawitz - 1965 - Mineola, N.Y.: Dover Publications.
Basic proof theory.A. S. Troelstra - 1996 - New York: Cambridge University Press. Edited by Helmut Schwichtenberg.
Natural Deduction: A Proof-Theoretical Study.Richmond Thomason - 1965 - Journal of Symbolic Logic 32 (2):255-256.

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