Logic may be simple. Logic, congruence and algebra

Logic and Logical Philosophy 5:129-147 (1997)
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Abstract

This paper is an attempt to clear some philosophical questions about the nature of logic by setting up a mathematical framework. The notion of congruence in logic is defined. A logical structure in which there is no non-trivial congruence relation, like some paraconsistent logics, is called simple. The relations between simplicity, the replacement theorem and algebraization of logic are studied (including MacLane-Curry’s theorem and a discussion about Curry’s algebras). We also examine how these concepts are related to such notions as semantics, truth-functionality and bivalence. We argue that a logic, which is simple, can deserve the name logic and that the opposite view is connected with a reductionist perspective (reduction of logic to algebra)

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2003

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10.12775/llp.1997.009

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Jean-Yves Beziau
Federal University of Rio de Janeiro

Citations of this work

BookReview.Jean-Yves Beziau - 2012 - Studia Logica 100 (3):653-657.
Sentence, proposition and identity.Jean-Yves Béziau - 2007 - Synthese 154 (3):371 - 382.

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Abolition of the Fregean Axiom.Roman Suszko - 1975 - Lecture Notes in Mathematics 453:169-239.
Dual-Intuitionistic Logic.Igor Urbas - 1996 - Notre Dame Journal of Formal Logic 37 (3):440-451.
A semantical analysis of the calculi Cn.Newton C. A. da Costa - 1977 - Notre Dame Journal of Formal Logic 18:621.
On the unity of logic.Jean-Yves Girard - 1993 - Annals of Pure and Applied Logic 59 (3):201-217.

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