Logics of rejection: two systems of natural deduction

Logique Et Analyse 146:169-208 (1994)
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Abstract

This paper presents two systems of natural deduction for the rejection of non-tautologies of classical propositional logic. The first system is sound and complete with respect to the body of all non-tautologies, the second system is sound and complete with respect to the body of all contradictions. The second system is a subsystem of the first. Starting with Jan Łukasiewicz's work, we describe the historical development of theories of rejection for classical propositional logic. Subsequently, we present the two systems of natural deduction and prove them to be sound and complete. We conclude with a ‘Theorem of Inversion’.

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Allard Tamminga
University of Greifswald

Citations of this work

A natural deduction system for first degree entailment.Allard M. Tamminga & Koji Tanaka - 1999 - Notre Dame Journal of Formal Logic 40 (2):258-272.
Sequent-type rejection systems for finite-valued non-deterministic logics.Martin Gius & Hans Tompits - 2023 - Journal of Applied Non-Classical Logics 33 (3):606-640.

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References found in this work

Aristotle's Syllogistic from the Standpoint of Modern Formal Logic.JAN LUKASIEWICZ - 1951 - Revue de Métaphysique et de Morale 57 (4):456-458.
A System of Modal Logic.Jan Łukasiewicz - 1953 - Proceedings of the XIth International Congress of Philosophy 14:82-87.
Refutation systems in modal logic.Valentin Goranko - 1994 - Studia Logica 53 (2):299 - 324.
On proofs of rejection.Walenty Staszek - 1971 - Studia Logica 29 (1):17 - 25.

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