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Winter 1998 Idempotent Full Paraconsistent Negations are not Algebraizable
Jean-Yves Béziau
Notre Dame J. Formal Logic 39(1): 135-139 (Winter 1998). DOI: 10.1305/ndjfl/1039293025

Abstract

Using methods of abstract logic and the theory of valuation, we prove that there is no paraconsistent negation obeying the law of double negation and such that $\neg(a\wedge\neg a)$ is a theorem which can be algebraized by a technique similar to the Tarski-Lindenbaum technique.

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Jean-Yves Béziau. "Idempotent Full Paraconsistent Negations are not Algebraizable." Notre Dame J. Formal Logic 39 (1) 135 - 139, Winter 1998. https://doi.org/10.1305/ndjfl/1039293025

Information

Published: Winter 1998
First available in Project Euclid: 7 December 2002

zbMATH: 0968.03030
MathSciNet: MR1671750
Digital Object Identifier: 10.1305/ndjfl/1039293025

Subjects:
Primary: 03B53
Secondary: 03B22

Rights: Copyright © 1998 University of Notre Dame

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Vol.39 • No. 1 • Winter 1998
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