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A Routley-Meyer affixing style semantics for logics containing Aristotle's Thesis
Studia Logica 48 (2):235-241 (1989)
Abstract
We provide a semantics for relevant logics with addition of Aristotle's Thesis, ∼(A→∼A) and also Boethius,(A→B)→∼(A→∼B). We adopt the Routley-Meyer affixing style of semantics but include in the model structures a regulatory structure for all interpretations of formulae, with a view to obtaining a lessad hoc semantics than those previously given for such logics. Soundness and completeness are proved, and in the completeness proof, a new corollary to the Priming Lemma is introduced (c.f.Relevant Logics and their Rivals I, Ridgeview, 1982).Other Versions
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Citations of this work
Connexive logics. An overview and current trends.Hitoshi Omori & Heinrich Wansing - forthcoming - Logic and Logical Philosophy:1.
Consistent Theories in Inconsistent Logics.Franci Mangraviti & Andrew Tedder - 2023 - Journal of Philosophical Logic 52 (04):1133-1148.
The non-relevant De Morgan minimal logic in Routley-Meyer semantics with no designated points.Gemma Robles & José M. Méndez - 2014 - Journal of Applied Non-Classical Logics 24 (4):321-332.
Aristotle's Thesis between paraconsistency and modalization.Claudio Pizzi - 2005 - Journal of Applied Logic 3 (1):119-131.
References found in this work
Aristotle's thesis in consistent and inconsistent logics.Chris Mortensen - 1984 - Studia Logica 43 (1-2):107 - 116.
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