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Super-Strict Implications

Guido Gherardi, Eugenio Orlandelli

2021Bulletin of the Section of Logic13 citationsDOIOpen Access PDF

Abstract

This paper introduces the logics of super-strict implications, where a super-strict implication is a strengthening of C.I. Lewis' strict implication that avoids not only the paradoxes of material implication but also those of strict implication. The semantics of super-strict implications is obtained by strengthening the (normal) relational semantics for strict implication. We consider all logics of super-strict implications that are based on relational frames for modal logics in the modal cube. it is shown that all logics of super-strict implications are connexive logics in that they validate Aristotle's Theses and (weak) Boethius's Theses. A proof-theoretic characterisation of logics of super-strict implications is given by means of G3-style labelled calculi, and it is proved that the structural rules of inference are admissible in these calculi. It is also shown that validity in the S5-based logic of super-strict implications is equivalent to validity in G. Priest's negation-as-cancellation-based logic. Hence, we also give a cut-free calculus for Priest's logic.

Topics & Concepts

T-norm fuzzy logicsNegationModal logicMonoidal t-norm logicAccessibility relationSemantics (computer science)ModalMathematicsKripke semanticsClassical logicNormal modal logicEpistemic modal logicCalculus (dental)Algebra over a fieldComputer scienceEpistemologyDiscrete mathematicsDescription logicPure mathematicsTheoretical computer scienceMultimodal logicPhilosophyProgramming languageArtificial intelligenceFuzzy logicMedicineChemistryFuzzy setPolymer chemistryMembership functionFuzzy numberDentistryLogic, Reasoning, and KnowledgeAdvanced Algebra and LogicLogic, programming, and type systems
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