Algebraization of logics defined by literal-paraconsistent or literal-paracomplete matrices

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Mathematical Logic Quarterly 54 (2):153-166 (2008)
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Abstract

We study the algebraizability of the logics constructed using literal-paraconsistent and literal-paracomplete matrices described by Lewin and Mikenberg in [11], proving that they are all algebraizable in the sense of Blok and Pigozzi in [3] but not finitely algebraizable. A characterization of the finitely algebraizable logics defined by LPP-matrices is given.We also make an algebraic study of the equivalent algebraic semantics of the logics associated to the matrices ℳ32,2, ℳ32,1, ℳ31,1, ℳ31,3, and ℳ4 appearing in [11] proving that they are not varieties and finding the free algebra over one generator

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10.1002/malq.200710021

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Combining Valuations with Society Semantics.Víctor L. Fernández & Marcelo E. Coniglio - 2003 - Journal of Applied Non-Classical Logics 13 (1):21-46.
Equivalential and algebraizable logics.Burghard Herrmann - 1996 - Studia Logica 57 (2-3):419 - 436.

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