Abstract
AbstractThe aim of this paper is to present a system of modal connexive logic based on a situation semantics. In general, modal connexive logics are extensions of standard modal logics that incorporate Aristotle’s and Boethius’ theses, that is the thesis that a sentence cannot imply its negation and the thesis that a sentence cannot imply a pair of contradictory sentences. A key problem in devising a connexive logic is to come up with a system that is both sufficiently strong to fulfill some specific connexive theses and sufficiently well-motivated from a semantical point of view. The approach proposed here tries to address this problem by defining an appropriate connexive relation in terms of more basic notions. The result is a well-motivated system of modal connexive logic that nicely fits in both with the traditional ideas concerning the connexive conditional and with the current developments in connexive logic.
Funder
Università Cattolica del Sacro Cuore
Publisher
Springer Science and Business Media LLC
Subject
History and Philosophy of Science,Logic
Reference26 articles.
1. Austin, J., Truth, Proceedings of the Aristotelian Society, Supplementary Volume 24:111–128, 1950.
2. Barwise, J., The Situation in Logic, Center for the Study of Language (CSLI), Stanford, 1989.
3. Barwise, J., and J. Seligman, Information Flow. The Logic of Distributed Systems, Cambridge University Press, 1997.
4. Cantwell, J., The logic of conditional negation, Notre Dame Journal of Formal Logic 49:245–260, 2008.
5. Chellas, B.F., Modal Logic. An Introduction, Cambridge University Press, 1980.