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16

APAL
2006

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Frege systems for extensible modal logics

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Frege systems for extensible modal logics

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By a well-known result of Cook and Reckhow [4, 12], all Frege systems for the Classical Propositional Calculus (CPC) are polynomially equivalent. Mints and Kojevnikov [11] have recently shown p-equivalence of Frege systems for the Intuitionistic Propositional Calculus (IPC) in the standard language, building on a description of admissible rules of IPC by Iemhoff [8]. We prove a similar result for an infinite family of normal modal logics, including K4, GL, S4, and S4Grz.

Emil Jerábek

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APAL 2006 | Classical Propositional Calculus | Frege Systems | Propositional Calculus |

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Added	10 Dec 2010
Updated	10 Dec 2010
Type	Journal
Year	2006
Where	APAL
Authors	Emil Jerábek

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