Abstract Algebraic Logic

2021 ◽  
pp. 71-142
Author(s):  
Josep Maria Font
Keyword(s):  
Algebraic Logic ◽  
Abstract Algebraic Logic

An abstract algebraic logic approach to tetravalent modal logics

2000 ◽  
Vol 65 (2) ◽  
pp. 481-518 ◽  
Author(s):  
Josep Maria Font ◽  
Miquel Rius
Keyword(s):  
Algebraic Logic ◽  
Modal Logics ◽  
The Other ◽  
Abstract Algebraic Logic ◽  
Algebraic Semantics ◽  
Modal Algebras ◽  
Logic Approach ◽  
Abstract Logics ◽  
Joint Study

AbstractThis paper contains a joint study of two sentential logics that combine a many-valued character, namely tetravalence, with a modal character; one of them is normal and the other one quasinormal. The method is to study their algebraic counterparts and their abstract models with the tools of Abstract Algebraic Logic, and particularly with those of Brown and Suszko's theory of abstract logics as recently developed by Font and Jansana in their “A General Algebraic Semantics for Sentential Logics”. The logics studied here arise from the algebraic and lattice-theoretical properties we review of Tetravalent Modal Algebras, a class of algebras studied mainly by Loureiro, and also by Figallo. Landini and Ziliani, at the suggestion of the late Antonio Monteiro.

scholarly journals Categorical Abstract Algebraic Logic: Equivalential π-Institutions

2008 ◽  
Vol 6 ◽  
Author(s):  
George Voutsadakis
Keyword(s):  
Matrix Theory ◽  
Algebraic Logic ◽  
Characterization Theorem ◽  
Abstract Algebraic Logic ◽  
Transfer Theorem ◽  
Deductive Systems

The theory of equivalential deductive systems, as introduced by Prucnal and Wrónski and further developed by Czelakowski, is abstracted to cover the case of logical systems formalized as π-institutions. More precisely, the notion of an N-equivalence system for a given π-institution is introduced. A characterization theorem for N-equivalence systems, previously proven for N-parameterized equivalence systems, is revisited and a “transfer theorem” for N-equivalence systems is proven. For a π-institution I having an N-equivalence system, the maximum such system is singled out and, then, an analog of Herrmann’s Test, characterizing those N-protoalgebraic π-institutions having an N-equivalence system, is formulated. Finally, some of the rudiments of matrix theory are revisited in the context of π-institutions, as they relate to the existence of N-equivalence systems.

Extension Properties and Subdirect Representation in Abstract Algebraic Logic

Studia Logica ◽  
2017 ◽  
Vol 106 (6) ◽  
pp. 1065-1095
Author(s):  
Tomáš Lávička ◽  
Carles Noguera
Keyword(s):  
Algebraic Logic ◽  
Abstract Algebraic Logic ◽  
Subdirect Representation

COMPATIBILITY OPERATORS IN ABSTRACT ALGEBRAIC LOGIC

2016 ◽  
Vol 81 (2) ◽  
pp. 417-462 ◽  
Author(s):  
HUGO ALBUQUERQUE ◽  
JOSEP MARIA FONT ◽  
RAMON JANSANA
Keyword(s):  
Algebraic Logic ◽  
Special Kind ◽  
Integrated Approach ◽  
Abstract Algebraic Logic ◽  
Unified Framework ◽  
Recent Developments ◽  
Leibniz Operator ◽  
General Correspondence ◽  
Correspondence Theorem ◽  
Leibniz Hierarchy

AbstractThis paper presents a unified framework that explains and extends the already successful applications of the Leibniz operator, the Suszko operator, and the Tarski operator in recent developments in abstract algebraic logic. To this end, we refine Czelakowski’s notion of an S-compatibility operator, and introduce the notion of coherent family of S-compatibility operators, for a sentential logic S. The notion of coherence is a restricted property of commutativity with inverse images by surjective homomorphisms, which is satisfied by both the Leibniz and the Suszko operators. We generalize several constructions and results already existing for the mentioned operators; in particular, the well-known classes of algebras associated with a logic through each of them, and the notions of full generalized model of a logic and a special kind of S-filters (which generalizes the less-known notion of Leibniz filter). We obtain a General Correspondence Theorem, extending the well-known one from the theory of protoalgebraic logics to arbitrary logics and to more general operators, and strengthening its formulation. We apply the general results to the Leibniz and the Suszko operators, and obtain several characterizations of the main classes of logics in the Leibniz hierarchy by the form of their full generalized models, by old and new properties of the Leibniz operator, and by the behaviour of the Suszko operator. Some of these characterizations complete or extend known ones, for some classes in the hierarchy, thus offering an integrated approach to the Leibniz hierarchy that uncovers some new, nice symmetries.

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