Categorical abstract algebraic logic: The criterion for deductive equivalence

Mathematical Logic Quarterly 49 (4):347-352 (2003)
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Abstract

Equivalent deductive systems were introduced in [4] with the goal of treating 1-deductive systems and algebraic 2-deductive systems in a uniform way. Results of [3], appropriately translated and strengthened, show that two deductive systems over the same language type are equivalent if and only if their lattices of theories are isomorphic via an isomorphism that commutes with substitutions. Deductive equivalence of π-institutions [14, 15] generalizes the notion of equivalence of deductive systems. In [15, Theorem 10.26] this criterion for the equivalence of deductive systems was generalized to a criterion for the deductive equivalence of term π-institutions, forming a subclass of all π-institutions that contains those π-institutions directly corresponding to deductive systems. This criterion is generalized here to cover the case of arbitrary π-institutions

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10.1002/malq.200310036

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original Voutsadakis, George (2003) "Categorical abstract algebraic logic: Equivalent institutions". Studia Logica 74(1-2):275 - 311
reprint Voutsadakis, George (2003) "Categorical abstract algebraic logic: The criterion for deductive equivalence: The criterion for deductive equivalence". Mathematical Logic Quarterly 49(4):347
reprint Voutsadakis, George (2008) "Categorical Abstract Algebraic Logic: Equivalential π-Institutions". Australasian Journal of Logic 6():1-24

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Multi‐term π‐institutions and their equivalence.José Gil-Férez - 2006 - Mathematical Logic Quarterly 52 (5):505-526.

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References found in this work

Protoalgebraic logics.W. J. Blok & Don Pigozzi - 1986 - Studia Logica 45 (4):337 - 369.
Equivalential logics.Janusz Czelakowski - 1981 - Studia Logica 40 (3):227-236.
Equivalential and algebraizable logics.Burghard Herrmann - 1996 - Studia Logica 57 (2-3):419 - 436.

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