Algebraic Study of Two Deductive Systems of Relevance Logic

Algebraic Study of Two Deductive Systems of Relevance Logic

Josep Maria Font and Gonzalo Rodríguez

Source: Notre Dame J. Formal Logic Volume 35, Number 3 (1994), 369-397.

Abstract

In this paper two deductive systems (i.e., two consequence relations) associated with relevance logic are studied from an algebraic point of view. One is defined by the familiar, Hilbert-style, formalization of R; the other one is a weak version of it, called WR, which appears as the semantic entailment of the Meyer-Routley-Fine semantics, and which has already been suggested by Wójcicki for other reasons. This weaker consequence is first defined indirectly, using R, but we prove that the first one turns out to be an axiomatic extension of WR. Moreover we provide WR with a natural Gentzen calculus (of a classical kind). It is proved that both deductive systems have the same associated class of algebras but different classes of models on these algebras. The notion of model used here is an abstract logic, that is, a closure operator on an abstract algebra; the abstract logics obtained in the case of WR are also the models, in a natural sense, of the given Gentzen calculus.

Primary Subjects: 03B46

Secondary Subjects: 03G25, 06D30

Full-text: Open access

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Links and Identifiers

Permanent link to this document: http://projecteuclid.org/euclid.ndjfl/1040511344
Mathematical Reviews number (MathSciNet): MR1326120
Digital Object Identifier: doi:10.1305/ndjfl/1040511344
Zentralblatt MATH identifier: 0833.03007

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