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On the Provable Contradictions of the Connexive Logics C and C3

Satoru Niki, Heinrich Wansing

2023Journal of Philosophical Logic18 citationsDOIOpen Access PDF

Abstract

Abstract Despite the tendency to be otherwise, some non-classical logics are known to validate formulas that are invalid in classical logic. A subclass of such systems even possesses pairs of a formula and its negation as theorems, without becoming trivial. How should these provable contradictions be understood? The present paper aims to shed light on aspects of this phenomenon by taking as samples the constructive connexive logic C , which is obtained by a simple modification of a system of constructible falsity, namely N4 , as well as its non-constructive extension C3 . For these systems, various observations concerning provable contradictions are made, using mainly a proof-theoretic approach. The topics covered in this paper include: how new contradictions are found from parts of provable contradictions; how to characterise provable contradictions in C3 that are constructive; how contradictions can be seen from the relative viewpoint of strong implication; and as an appendix an attempt at generating provable contradictions in C3 .

Topics & Concepts

ConstructiveNegationExtension (predicate logic)FalsitySimple (philosophy)Constructive proofMathematicsEpistemologyLaw of excluded middleClassical logicContradictionComputer scienceCalculus (dental)Algebra over a fieldPure mathematicsDiscrete mathematicsPhilosophyProcess (computing)MedicineDentistryProgramming languageOperating systemAdvanced Algebra and LogicLogic, Reasoning, and KnowledgeLogic, programming, and type systems