Many Concepts and Two Logics of Algorithmic Reduction

Studia Logica 91 (1):1-24 (2009)
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Abstract

Within the program of finding axiomatizations for various parts of computability logic, it was proven earlier that the logic of interactive Turing reduction is exactly the implicative fragment of Heyting’s intuitionistic calculus. That sort of reduction permits unlimited reusage of the computational resource represented by the antecedent. An at least equally basic and natural sort of algorithmic reduction, however, is the one that does not allow such reusage. The present article shows that turning the logic of the first sort of reduction into the logic of the second sort of reduction takes nothing more than just deleting the contraction rule from its Gentzen-style axiomatization. The first sort of interactive reduction is also shown to come in three natural versions. While those three versions are very different from each other, their logical behaviors turn out to be indistinguishable, with that common behavior being precisely captured by implicative intuitionistic logic. Among the other contributions of the present article is an informal introduction of a series of new — finite and bounded — versions of recurrence operations and the associated reduction operations

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10.1007/s11225-009-9164-7

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Citations of this work

In the Beginning was Game Semantics?Giorgi Japaridze - 2009 - In Ondrej Majer, Ahti-Veikko Pietarinen & Tero Tulenheimo, Games: Unifying Logic, Language, and Philosophy. Dordrecht, Netherland: Springer Verlag. pp. 249--350.
Towards applied theories based on computability logic.Giorgi Japaridze - 2010 - Journal of Symbolic Logic 75 (2):565-601.
Separating the basic logics of the basic recurrences.Giorgi Japaridze - 2012 - Annals of Pure and Applied Logic 163 (3):377-389.
The Parallel versus Branching Recurrences in Computability Logic.Wenyan Xu & Sanyang Liu - 2013 - Notre Dame Journal of Formal Logic 54 (1):61-78.

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References found in this work

Linear Logic.Jean-Yves Girard - 1987 - Theoretical Computer Science 50:1–101.
A game semantics for linear logic.Andreas Blass - 1992 - Annals of Pure and Applied Logic 56 (1-3):183-220.
Introduction to computability logic.Giorgi Japaridze - 2003 - Annals of Pure and Applied Logic 123 (1-3):1-99.
In the Beginning was Game Semantics?Giorgi Japaridze - 2009 - In Ondrej Majer, Ahti-Veikko Pietarinen & Tero Tulenheimo, Games: Unifying Logic, Language, and Philosophy. Dordrecht, Netherland: Springer Verlag. pp. 249--350.

View all 8 references / Add more references