首页 | 本学科首页   官方微博 | 高级检索  
     


Conditional Excluded Middle in Systems of Consequential Implication
Authors:C.?Pizzi  author-information"  >  author-information__contact u-icon-before"  >  mailto:pizzic@unisi.it"   title="  pizzic@unisi.it"   itemprop="  email"   data-track="  click"   data-track-action="  Email author"   data-track-label="  "  >Email author,T.?Williamson
Affiliation:(1) Dipartimento di Filosofia e Scienze Sociali, Università di Siena, Via Roma 47, 53100 Siena, Italy;(2) New College, Oxford, OX1 3BN, United Kingdom
Abstract:It is natural to ask under what conditions negating a conditional is equivalent to negating its consequent. Given a bivalent background logic, this is equivalent to asking about the conjunction of Conditional Excluded Middle (CEM, opposite conditionals are not both false) and Weak Boethius' Thesis (WBT, opposite conditionals are not both true). In the system CI.0 of consequential implication, which is intertranslatable with the modal logic KT, WBT is a theorem, so it is natural to ask which instances of CEM are derivable. We also investigate the systems CIw and CI of consequential implication, corresponding to the modal logics K and KD respectively, with occasional remarks about stronger systems. While unrestricted CEM produces modal collapse in all these systems, CEM restricted to contingent formulas yields the Alt2 axiom (semantically, each world can see at most two worlds), which corresponds to the symmetry of consequential implication. It is proved that in all the main systems considered, a given instance of CEM is derivable if and only if the result of replacing consequential implication by the material biconditional in one or other of its disjuncts is provable. Several related results are also proved. The methods of the paper are those of propositional modal logic as applied to a special sort of conditional.
Keywords:conditionals  modal logic  Boethius
本文献已被 SpringerLink 等数据库收录!
设为首页 | 免责声明 | 关于勤云 | 加入收藏

Copyright©北京勤云科技发展有限公司  京ICP备09084417号