A note on the proof theory the λII-calculus

Studia Logica 54 (2):199 - 230 (1995)
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Abstract

The lambdaPi-calculus, a theory of first-order dependent function types in Curry-Howard-de Bruijn correspondence with a fragment of minimal first-order logic, is defined as a system of (linearized) natural deduction. In this paper, we present a Gentzen-style sequent calculus for the lambdaPi-calculus and prove the cut-elimination theorem. The cut-elimination result builds upon the existence of normal forms for the natural deduction system and can be considered to be analogous to a proof provided by Prawitz for first-order logic. The type-theoretic setting considered here elegantly illustrates the distinction between the processes of normalization in a natural deduction system and cut-elimination in a Gentzen-style sequent calculus.

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10.1007/bf01063152

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David Pym
University College London

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References found in this work

Natural deduction: a proof-theoretical study.Dag Prawitz - 1965 - Mineola, N.Y.: Dover Publications.
First-order logic.Raymond Merrill Smullyan - 1968 - New York [etc.]: Springer Verlag.
Mathematical logic.Stephen Cole Kleene - 1967 - Mineola, N.Y.: Dover Publications.
First-order Logic.William Craig - 1975 - Journal of Symbolic Logic 40 (2):237-238.
A natural extension of natural deduction.Peter Schroeder-Heister - 1984 - Journal of Symbolic Logic 49 (4):1284-1300.

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