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Intuitionistic Socratic procedures
Journal of Applied Non-Classical Logics 15 (4):453-464 (2005)
Abstract
In the paper we study the method of Socratic proofs in the intuitionistic propositional logic as a reduction procedure. Our approach consists in constructing for a given sequent α a finite tree of sets of sequents by using invertible reduction rules of the kind: ? is valid if and only if ?1 is valid or... or ?n is valid. From such a tree either a Gentzen-style proof of α or an Aristotle-style refutation of α can also be extractedOther Versions
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Citations of this work
Dual Erotetic Calculi and the Minimal LFI.Szymon Chlebowski & Dorota Leszczyńska-Jasion - 2015 - Studia Logica 103 (6):1245-1278.
Socratic Trees.Dorota Leszczyńska-Jasion, Mariusz Urbański & Andrzej Wiśniewski - 2013 - Studia Logica 101 (5):959-986.
Admissibility and refutation: some characterisations of intermediate logics.Jeroen P. Goudsmit - 2014 - Archive for Mathematical Logic 53 (7-8):779-808.
The Method of Socratic Proofs: From the Logic of Questions to Proof Theory.Dorota Leszczyńska-Jasion - 2021 - In Moritz Cordes, Asking and Answering: Rivalling Approaches to Interrogative Methods. Tübingen: Narr Francke Attempto. pp. 183–198.
Logic, Reasoning, and Rationality.Erik Weber, Joke Meheus & Dietlinde Wouters (eds.) - 2014 - Dordrecht, Netherland: Springer.
References found in this work
Aristotle's syllogistic from the standpoint of modern formal logic.Jan Łukasiewicz - 1957 - New York: Garland.
Contraction-free sequent calculi for intuitionistic logic.Roy Dyckhoff - 1992 - Journal of Symbolic Logic 57 (3):795-807.
Refutations, proofs, and models in the modal logic K.Tomasz Skura - 2002 - Studia Logica 70 (2):193 - 204.
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