A Generalization of the Routley-Meyer Semantic Framework

Journal of Philosophical Logic 44 (4):411-427 (2015)
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Abstract

We develop an axiomatic theory of “generalized Routley-Meyer logics.” These are first-order logics which are can be characterized by model theories in a certain generalization of Routley-Meyer semantics. We show that all GRM logics are subclassical, have recursively enumerable consequence relations, satisfy the compactness theorem, and satisfy the standard structural rules and conjunction and disjunction introduction/elimination rules. We also show that the GRM logics include classical logic, intuitionistic logic, LP/K3/FDE, and the relevant logics

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10.1007/s10992-014-9328-4

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Morgan Thomas
University of Connecticut

Citations of this work

On Sahlqvist Formulas in Relevant Logic.Guillermo Badia - 2018 - Journal of Philosophical Logic 47 (4):673-691.
The relevant fragment of first order logic.Guillermo Badia - 2016 - Review of Symbolic Logic 9 (1):143-166.
Infinitary propositional relevant languages with absurdity.Guillermo Badia - 2017 - Review of Symbolic Logic 10 (4):663-681.

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References found in this work

Modal Logic: Graph. Darst.Patrick Blackburn, Maarten de Rijke & Yde Venema - 2001 - New York: Cambridge University Press. Edited by Maarten de Rijke & Yde Venema.
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