The Reducibility of Modal Syllogisms Based on the Syllogism ▯EI◇O-2
DOI: 10.54647/mathematics110402 85 Downloads 151374 Views
Author(s)
Abstract
Syllogistic reasoning plays a crucial part in natural language information processing. For the purpose of providing a consistent interpretation for Aristotelian modal syllogistic, this paper firstly proves the validity of the syllogism EI◇O-2, and then takes it as the basic axiom to derive the other 38 valid modal syllogisms by taking advantage of some reasoning rules in classical propositional logic, the symmetry of two Aristotelian quantifiers (i.e. some and no), the transformation between any one of Aristotelian quantifiers and its three negative quantifiers, as well as some facts in first order logic. In other words, there are reducible relations between the modal syllogism EI◇O-2 and the other 38 valid modal syllogisms. There are infinitely many instances in natural language corresponding to any valid modal syllogism. Therefore, this study has theoretical value and practical significance for natural language information processing in computer science.
Keywords
Aristotelian syllogisms; Aristotelian modal syllogisms; Validity; Reducible relation
Cite this paper
Long Wei, Xiaojun Zhang,
The Reducibility of Modal Syllogisms Based on the Syllogism ▯EI◇O-2
, SCIREA Journal of Mathematics.
Volume 8, Issue 3, June 2023 | PP. 87-96.
10.54647/mathematics110402
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