Upper bounds on complexity of Frege proofs with limited use of certain schemata

Archive for Mathematical Logic 45 (4):431-446 (2006)
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Abstract

The paper considers a commonly used axiomatization of the classical propositional logic and studies how different axiom schemata in this system contribute to proof complexity of the logic. The existence of a polynomial bound on proof complexity of every statement provable in this logic is a well-known open question.The axiomatization consists of three schemata. We show that any statement provable using unrestricted number of axioms from the first of the three schemata and polynomially-bounded in size set of axioms from the other schemata, has a polynomially-bounded proof complexity. In addition, it is also established, that any statement, provable using unrestricted number of axioms from the remaining two schemata and polynomially-bounded in size set of axioms from the first scheme, also has a polynomially-bounded proof complexity

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2005

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10.1007/s00153-005-0325-8

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Pavel Naumov
University of Southampton

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References found in this work

Introduction to mathematical logic..Alonzo Church - 1944 - Princeton,: Princeton university press: London, H. Milford, Oxford university press. Edited by C. Truesdell.
Begriffsschrift, a Formula Language, Modeled upon that of Arithmetic, for Pure Thought [1879].Gottlob Frege - 1879 - From Frege to Gödel: A Source Book in Mathematical Logic 1931:1--82.

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