Abstract
AbstractThe paper’s novelty is in combining two comparatively new fields of research: non-transitive logic and the proof method of correspondence analysis. To be more detailed, in this paper the latter is adapted to Weir’s non-transitive trivalent logic $${\mathbf{NC}}_{\mathbf{3}}$$
NC
3
. As a result, for each binary extension of $${\mathbf{NC}}_{\mathbf{3}}$$
NC
3
, we present a sound and complete Lemmon-style natural deduction system. Last, but not least, we stress the fact that Avron and his co-authors’ general method of obtaining n-sequent proof systems for any n-valent logic with deterministic or non-deterministic matrices is not applicable to $${\mathbf{NC}}_{\mathbf{3}}$$
NC
3
and its binary extensions.
Publisher
Springer Science and Business Media LLC
Subject
Linguistics and Language,Philosophy,Computer Science (miscellaneous)
Reference67 articles.
1. Aguilera, J. P., & Baaz, M. (2019). Unsound inferences make proofs shorter. Journal of Symbolic Logic, 84(1), 102–122.
2. Anderson, A. R., & Belnap, N. D. (1975). Entailment. The logic of relevance and necessity (Vol. I). Princeton University Press.
3. Anshakov, O., & Rychkov, S. (1994). On finitely-valued propositional logical calculi. Notre Dame Journal of Formal Logic, 36, 606–629.
4. Asenjo, F. G. (1966). A calculus of antinomies. Notre Dame Journal of Formal Logic, 7, 103–105.
5. Avron, A., & Lev, I. (2001). Canonical propositional Gentzen-type systems. In The proceedings of the 1st international joint conference on automated reasoning (IJCAR 2001) (Vol. 2083, pp. 529–544). Springer Verlag, Lecture Notes in Artificial Intelligence.
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