1. A New View on Fuzzy Hypermodules.
- Author
-
Jian Ming Zhan, Davvaz, Bijan, and Shum, K. P.
- Subjects
FUZZY sets ,SET theory ,FUZZY logic ,MATHEMATICAL logic ,MATHEMATICS - Abstract
We describe the relationship between the fuzzy sets and the algebraic hyperstructures. In fact, this paper is a continuation of the ideas presented by Davvaz in ( Fuzzy Sets Syst., 117: 477– 484, 2001) and Bhakat and Das in ( Fuzzy Sets Syst., 80: 359–368, 1996). The concept of the quasicoincidence of a fuzzy interval value with an interval-valued fuzzy set is introduced and this is a natural generalization of the quasi-coincidence of a fuzzy point in fuzzy sets. By using this new idea, the concept of interval-valued ( α, β)-fuzzy sub-hypermodules of a hypermodule is defined. This newly defined interval-valued ( α, β)-fuzzy sub-hypermodule is a generalization of the usual fuzzy sub-hypermodule. We shall study such fuzzy sub-hypermodules and consider the implication-based interval-valued fuzzy sub-hypermodules of a hypermodule. [ABSTRACT FROM AUTHOR]
- Published
- 2007
- Full Text
- View/download PDF