Normal deduction in the intuitionistic linear logic

Archive for Mathematical Logic 37 (5-6):415-425 (1998)
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Abstract

We describe a natural deduction system NDIL for the second order intuitionistic linear logic which admits normalization and has a subformula property. NDIL is an extension of the system for !-free multiplicative linear logic constructed by the author and elaborated by A. Babaev. Main new feature here is the treatment of the modality !. It uses a device inspired by D. Prawitz' treatment of S4 combined with a construction $<\Gamma>$ introduced by the author to avoid cut-like constructions used in $\otimes$ -elimination and global restrictions employed by Prawitz. Normal form for natural deduction is obtained by Prawitz translation of cut-free sequent derivations

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10.1007/s001530050106

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Citations of this work

A normalizing system of natural deduction for intuitionistic linear logic.Sara Negri - 2002 - Archive for Mathematical Logic 41 (8):789-810.
On an Intuitionistic Modal Logic.G. M. Bierman & V. C. V. De Paiva - 2000 - Studia Logica 65 (3):383 - 416.
In memoriam: Grigori E. Mints 1939–2014.Solomon Feferman & Vladimir Lifschitz - 2015 - Bulletin of Symbolic Logic 21 (1):31-33.

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References found in this work

The correspondence between cut-elimination and normalization.J. Zucker - 1974 - Annals of Mathematical Logic 7 (1):1-112.
Normalization as a homomorphic image of cut-elimination.Garrel Pottinger - 1977 - Annals of Mathematical Logic 12 (3):323.
Natural deduction for intuitionistic linear logic.A. S. Troelstra - 1995 - Annals of Pure and Applied Logic 73 (1):79-108.
Linear lambda-terms and natural deduction.G. Mints - 1998 - Studia Logica 60 (1):209-231.

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