A note on the geometry of reciprocal fuzzy relations

In (Fuzzy Sets and Systems 97 (1998) 33), we presented a fuzzy multipurpose decision making model integrating di erent preference representations based on additive reciprocal fuzzy preference relations. The main aim of this paper is to complete the decision model studying conditions under which reci

The purpose of this paper is to discuss the following three problems: (1) the number of equivalent classes of fuzzy subgroups of a group G, (2) the relationship between the number of equivalent classes of fuzzy subgroups and the order of a cyclic group G, (3) the relationship between the order of fu

The degenerate semi-Riemannian geometry of a Lie group is studied. Then a naturally reductive homogeneous semi-Riemannian space is obtained from the Lie group in a natural way.

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