Title :
Bi-superintuitionistic logics for rough sets
Author :
Akama, Seiki ; Murai, Takashi ; Kudo, Yasuo
Abstract :
Bi-intuitionistic logic, also called Heyting-Brouwer logic, is a logic based on Heyting and Brouwerian algebras. A rough set logic based on regular double Stone algebra is regarded as the extension of bi-intuitionistic logic without intuitionistic and dual intuitionistic implication. In this paper, we discuss the aspects of bi-superintuitionistic logics which are stronger than bi-intuitionistic logic as a foundation for rough set logics. We propose some bi-superintuitionistic logics with a Kripke semantics and natural deduction. These logics can serve as foundations for reasoning about rough and vague information.
Keywords :
formal logic; rough set theory; Brouwerian algebra; Heyting algebra; Heyting-Brouwer logic; Kripke semantics; bisuperintuitionistic logics; natural deduction; regular double-Stone algebra; rough set logic; Approximation methods; Boolean algebra; Cognition; Cost accounting; Rough sets; Semantics; Bi-intuitionistic logic; Brouwerian algebra; Heyting algebra; Kripke semantics; bi-superintuitionistic logic; natural deduction; rough set logic;
Conference_Titel :
Granular Computing (GrC), 2013 IEEE International Conference on
Conference_Location :
Beijing
DOI :
10.1109/GrC.2013.6740372
