Structures on intuitionistic fuzzy relations

Fuzzy relations are able to model vagueness, in the sense that they provide the degree to which two objects are related to each other. However, they cannot model uncertainty: there is no means to attribute reliability information to the membership degrees. Intuitionistic fuzzy sets, as deÿned by Ata

In this paper we present di erent theorems that allow us to build intuitionistic fuzzy relations on a set with predetermined properties, i.e. theorems that allow us to build re exive, symmetric, antisymmetric, perfect antisymmetric and transitive intuitionistic fuzzy relations from fuzzy relations w

In this article we exploit the concept of probability for defining the fuzzy entropy of intuitionistic fuzzy sets ~IFSs!. We then propose two families of entropy measures for IFSs and also construct the axiom definition and properties. Two definitions of entropy for IFSs proposed by Burillo and Bust

We extend the main idea of a fuzzy analysis of consensus-that is based on a concept of a distance from consensus-to a case when individual testimonies are individual intuitionistic fuzzy preference relations, as opposed to fuzzy preference relations commonly used. Intuitionistic fuzzy preference rel