Routley-Meyer ternary relational semantics for intuitionistic-type negations

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London, United Kingdom: Elsevier, Academic Press. Edited by José M. Méndez (2018)
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Abstract

Routley-Meyer Ternary Relational Semantics for Intuitionistic-type Negations examines how to introduce intuitionistic-type negations into RM-semantics. RM-semantics is highly malleable and capable of modeling families of logics which are very different from each other. This semantics was introduced in the early 1970s, and was devised for interpreting relevance logics. In RM-semantics, negation is interpreted by means of the Routley operator, which has been almost exclusively used for modeling De Morgan negations. This book provides research on particular features of intuitionistic-type of negations in RM-semantics, while also defining the basic systems and many of their extensions by using models with or without a set of designated points.

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BC199.N4.R63 2018

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0081007515   9780081007518
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Author Profiles

Gemma Robles
Universidad de León
José M. Méndez
Universidad de Salamanca

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Basic Quasi-Boolean Expansions of Relevance Logics.Gemma Robles & José M. Méndez - 2021 - Journal of Philosophical Logic 50 (4):727-754.

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