Property (S) of fuzzy measure and Riesz's theorem

measure space have been improved in essence.

In this paper, we show that weakly null-additive fuzzy measures on metric spaces possess regularity. Lusin's theorem, which is well-known in classical measure theory, is generalized to fuzzy measure space by using the regularity and weakly null-additivity. A version of Egoro 's theorem for the fuzzy

The goal of this paper is to introduce random measures into fuzzy u-algebras. The structure of random measures of fuzzy sets is studied. Extension theorems of random measure on fuzzy algebras to the generated u-algebras are founded. It shows that Bochner integrals with respect to measures of fuzzy s

let m → E be a finitely additive measure with finite semivariation, defined on a δ-ring of subsets of a given set S. A theory of integration of vector-valued functions f S → E, applicable to the stochastic integration in Banach spaces, is developed in [6, Sect. 5]. Many times a measure m is defined