Reduction Rules for Intuitionistic $${{\lambda}{\rho}}$$ λ ρ -calculus

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Studia Logica 103 (6):1225-1244 (2015)
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Abstract

The third author gave a natural deduction style proof system called the \-calculus for implicational fragment of classical logic in. In -calculus, 2015, Post-proceedings of the RIMS Workshop “Proof Theory, Computability Theory and Related Issues”, to appear), the fourth author gave a natural subsystem “intuitionistic \-calculus” of the \-calculus, and showed the system corresponds to intuitionistic logic. The proof is given with tree sequent calculus, but is complicated. In this paper, we introduce some reduction rules for the \-calculus, and give a simple and purely syntactical proof to the theorem by use of the reduction. In addition, we show that we can give a computation model with rich expressive power with our system

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10.1007/s11225-015-9616-1

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Lectures on the Curry-Howard isomorphism.Morten Heine Sørensen - 2006 - Boston: Elsevier. Edited by Paweł Urzyczyn.

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