Axiomatization of Some Basic and Modal Boolean Connexive Logics

Logica Universalis 15 (4):517-536 (2021)
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Abstract

Boolean connexive logic is an extension of Boolean logic that is closed under Modus Ponens and contains Aristotle’s and Boethius’ theses. According to these theses a sentence cannot imply its negation and the negation of a sentence cannot imply the sentence; and if the antecedent implies the consequent, then the antecedent cannot imply the negation of the consequent and if the antecedent implies the negation of the consequent, then the antecedent cannot imply the consequent. Such a logic was first introduced by Jarmużek and Malinowski, by means of so-called relating semantics and tableau systems. Subsequently its modal extension was determined by means of the combination of possible-worlds semantics and relating semantics. In the following article we present axiomatic systems of some basic and modal Boolean connexive logics. Proofs of completeness will be carried out using canonical models defined with respect to maximal consistent sets.

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10.1007/s11787-021-00291-4

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Mateusz Klonowski
Nicolaus Copernicus University

Citations of this work

Relating Semantics for Hyper-Connexive and Totally Connexive Logics.Jacek Malinowski & Ricardo Arturo Nicolás-Francisco - 2023 - Logic and Logical Philosophy (Special Issue: Relating Logic a):1-14.
Connexive Negation.Luis Estrada-González & Ricardo Arturo Nicolás-Francisco - 2023 - Studia Logica (Special Issue: Frontiers of Conn):1-29.

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