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Categorical Abstract Algebraic Logic: Prealgebraicity and Protoalgebraicity
Authors:George Voutsadakis
Affiliation:(1) School of Mathematics and Computer Science, Lake Superior State University, Sault Sainte Marie, MI 49783, USA
Abstract:Two classes of π are studied whose properties are similar to those of the protoalgebraic deductive systems of Blok and Pigozzi. The first is the class of N-protoalgebraic π-institutions and the second is the wider class of N-prealgebraic π-institutions. Several characterizations are provided. For instance, N-prealgebraic π-institutions are exactly those π-institutions that satisfy monotonicity of the N-Leibniz operator on theory systems and N-protoalgebraic π-institutions those that satisfy monotonicity of the N-Leibniz operator on theory families. Analogs of the correspondence property of Blok and Pigozzi for π-institutions are also introduced and their connections with preand protoalgebraicity are explored. Finally, relations of these two classes with the ($${mathcal{I}}$$, N)-algebraic systems, introduced previously by the author as an analog of the $${mathcal{S}}$$ -algebras of Font and Jansana, and with an analog of the Suszko operator of Czelakowski for π-institutions are also investigated. Presented by Josep Maria Font
Keywords:algebraic logic  equivalent deductive systems  equivalent institutions  protoalgebraic logics  equivalential logics  algebraizable deductive systems  adjunctions  equivalent categories  algebraizable institutions  Leibniz operator  Tarski operator  Leibniz hierarchy
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