Categorical foundations, fuzzy topology, fuzzy measures, and mathematical applications of fuzzy sets

This is a subsequent paper of [9]. By using the concepts of fuzzy number fuzzy measures [9] and fuzzy-valued functions [10], a theory of fuzzy integrals of fuzzy-valued functions with respect to fuzzy number fuzzy measures is built up. So far, it is a more general one following Sugeno's [5].

In several recent papers, the second named author introduces and studies some measures of noncompactness for fuzzy subsets of a classical (or of a fuzzy) metric space. The main purpose of this paper is that, by using the recent idea of I. Kupka, to introduce and to study some measures of noncompactn

From a mathematical point of view, the use of triangular norms as connectives in many-valued, in particular in [0, 1]valued logics and fuzzy logics is discussed. Also, an overview of some non-additive generalizations of classical measures is given. (~) 1997 Elsevier Science B.V.