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Axiomatizing logics closely related to varieties
Studia Logica 50 (3-4):607 - 622 (1991)
Abstract
Let V be a s.f.b. (strongly finitely based, see below) variety of algebras. The central result is Theorem 2 saying that the logic defined by all matrices (A, d) with d A V is finitely based iff the A V have 1st order definable cosets for their congruences. Theorem 3 states a similar axiomatization criterion for the logic determined by all matrices (A, A), A V, a term which is constant in V. Applications are given in a series of examples.Other Versions
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Citations of this work
Algebraization of quantifier logics, an introductory overview.István Németi - 1991 - Studia Logica 50 (3):485 - 569.
Finite replacement and finite Hilbert-style axiomatizability.B. Herrmann & W. Rautenberg - 1992 - Zeitschrift fur mathematische Logik und Grundlagen der Mathematik 38 (1):327-344.
A Finite Hilbert‐Style Axiomatization of the Implication‐Less Fragment of the Intuitionistic Propositional Calculus.Jordi Rebagliato & Ventura Verdú - 1994 - Mathematical Logic Quarterly 40 (1):61-68.
Replacing Modus Ponens With One-Premiss Rules.Lloyd Humberstone - 2008 - Logic Journal of the IGPL 16 (5):431-451.
Finite axiomatizability of logics of distributive lattices with negation.Sérgio Marcelino & Umberto Rivieccio - forthcoming - Logic Journal of the IGPL.
References found in this work
Theory of Logical Calculi: Basic Theory of Consequence Operations.Ryszard Wójcicki - 1988 - Dordrecht, Boston and London: Kluwer Academic Publishers.
O pewnym fragmencie implikacyjnego rachunku zdań.Helena Rasiowa - 1955 - Studia Logica 3 (1):208 - 226.
Axiomatization of the de Morgan type rules.B. Herrmann & W. Rautenberg - 1990 - Studia Logica 49 (3):333 - 343.
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