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Subprevarieties Versus Extensions. Application to the Logic of Paradox
Journal of Symbolic Logic 65 (2):756-766 (2000)
Abstract
In the present paper we prove that the poset of all extensions of the logic defined by a class of matrices whose sets of distinguished values are equationally definable by their algebra reducts is the retract, under a Galois connection, of the poset of all subprevarieties of the prevariety generated by the class of the algebra reducts of the matrices involved. We apply this general result to the problem of finding and studying all extensions of the logic of paradox. In order to solve this problem, we first study the structure of prevarieties of Kleene lattices. Then, we show that the poset of extensions of the logic of paradox forms a four-element chain, all the extensions being finitely many-valued and finitely-axiomatizable logics. There are just two proper consistent extensions of the logic of paradox. The first is the classical logic that is relatively axiomatized by the Modus ponens rule for the material implication. The second extension, being intermediate between the logic of paradox and the classical logic, is the one relatively axiomatized by the Ex Contradictione Quodlibet rule.Links
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Citations of this work
An Algebraic View of Super-Belnap Logics.Hugo Albuquerque, Adam Přenosil & Umberto Rivieccio - 2017 - Studia Logica 105 (6):1051-1086.
Gentzen's cut-free calculus versus the logic of paradox.Alexej P. Pynko - 2010 - Bulletin of the Section of Logic 39 (1/2):35-42.
Cut Elimination, Identity Elimination, and Interpolation in Super-Belnap Logics.Adam Přenosil - 2017 - Studia Logica 105 (6):1255-1289.
Extensions of paraconsistent weak Kleene logic.Francesco Paoli & Michele Pra Baldi - forthcoming - Logic Journal of the IGPL.
References found in this work
Functional Completeness and Axiomatizability within Belnap's Four-Valued Logic and its Expansions.Alexej P. Pynko - 1999 - Journal of Applied Non-Classical Logics 9 (1):61-105.
Definitional equivalence and algebraizability of generalized logical systems.Alexej P. Pynko - 1999 - Annals of Pure and Applied Logic 98 (1-3):1-68.
Characterizing Belnap's Logic via De Morgan's Laws.Alexej P. Pynko - 1995 - Mathematical Logic Quarterly 41 (4):442-454.
Distributive Lattices.Raymond Balbes & Philip Dwinger - 1977 - Journal of Symbolic Logic 42 (4):587-588.
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