New Insights on Syllogistic and Cut
DOI:
https://doi.org/10.22370/sst.2020.8.4920Palabras clave:
Sequent Calculus, Cut-Elimination Theorem, Theory of Oppositions, Substructural logicsResumen
There is a quite intentional resemblance between the Cut Rule and Aristotle’s Syllogism. In this paper some deep connections between Sequent Calculus and Syllogistics will be investigated. Taking into consideration Alvarez & Correia’s ´axiomatization of Syllogistics, currently the most complete available in the literature, I will show how this ancient logical system can be put into correspondence with the structural features of a special Sequent Calculus system, SS. On the grounds of this discovery I will present some improvements of the expressive power of Alvarez & Correia’s system. As for the philosophical consequences of ´the correspondence, I will give answers to several concerns Manuel Correia had on his system. A somewhat new philosophical relevance of the Cut-Elimination Theorem will be highlighted in the end.
Citas
Aristotle (1995). Prior analytics. In Barnes, J., editor, The Complete Works of Aristotle. One volume, digital edition, pages 39–113. Princeton.
Barrio, E. A., Pailos, F., and Szmuc, D. (2019). A hierarchy of classical and paraconsistent logics. Journal of Philosophical Logic.
Correia, M. (2017). La logica aristot ´ elica y sus perspectivas. ´ Pensamiento, 73(275):5–19.
De Morgan, A. (1880). Syllabus of a proposed system of logic. Harvard University Press.
Alvarez, E. and Correia, M. (2012). Syllogistics with indefinite terms. ´ History and Philosophy of Logic, 33(4):297–306.
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Esta obra está bajo una licencia internacional Creative Commons Atribución-NoComercial-SinDerivadas 4.0.