Several theorems have been proved, e.g. by Ralescu, Ralescu and Adams, Puri and Ralescu, and Klement, in order to unify the approach to uncertainty of both statistical and fuzzy origin. The present paper is motivated by the same instances and deals with some extensions of the measure-theoretical bases of fuzzy measures and convergence properties, e.g. a B. Levi-like theorem. © 1988
AbstractA general framework for a theory is presented that encompasses both statistical uncertainty,...
summary:In this paper, a general convergence theorem of fuzzy random variables is considered. Using ...
We establish minimal conditions on a fuzzy measure to make the measure convergence a sufficient cond...
AbstractA general framework for a theory is presented that encompasses both statistical uncertainty,...
AbstractLinks between fuzzy measures (cf. Höhle, Z. Wahrsch. Verw. Gebiete 36 (1976), 179–188) and s...
AbstractWe study fuzzy set-valued measures in a Banach space and their relationships to fuzzy random...
AbstractWe study fuzzy set-valued measures in a Banach space and their relationships to fuzzy random...
Abstract—Traditional probabilistic description of uncertainty is based on additive probability measu...
Abstract—Traditional probabilistic description of uncertainty is based on additive probability measu...
AbstractIn this paper we define the concepts of fuzzy random variable and the expectation of a fuzzy...
In this note, we consider several types of convergence theorems for the expected value of fuzzy vari...
Many discussions have been made on the problem of (i) What are Fuzzy Sets? since the origin of the t...
AbstractThis paper is devoted to the study of fuzzy observables. A characterization of fuzzy observa...
AbstractThe autocontinuity and some other concepts of a set function are introduced and Sugeno's fuz...
In this paper, we study the concept of statistical convergence on L?fuzzy normed spaces. Then we giv...
AbstractA general framework for a theory is presented that encompasses both statistical uncertainty,...
summary:In this paper, a general convergence theorem of fuzzy random variables is considered. Using ...
We establish minimal conditions on a fuzzy measure to make the measure convergence a sufficient cond...
AbstractA general framework for a theory is presented that encompasses both statistical uncertainty,...
AbstractLinks between fuzzy measures (cf. Höhle, Z. Wahrsch. Verw. Gebiete 36 (1976), 179–188) and s...
AbstractWe study fuzzy set-valued measures in a Banach space and their relationships to fuzzy random...
AbstractWe study fuzzy set-valued measures in a Banach space and their relationships to fuzzy random...
Abstract—Traditional probabilistic description of uncertainty is based on additive probability measu...
Abstract—Traditional probabilistic description of uncertainty is based on additive probability measu...
AbstractIn this paper we define the concepts of fuzzy random variable and the expectation of a fuzzy...
In this note, we consider several types of convergence theorems for the expected value of fuzzy vari...
Many discussions have been made on the problem of (i) What are Fuzzy Sets? since the origin of the t...
AbstractThis paper is devoted to the study of fuzzy observables. A characterization of fuzzy observa...
AbstractThe autocontinuity and some other concepts of a set function are introduced and Sugeno's fuz...
In this paper, we study the concept of statistical convergence on L?fuzzy normed spaces. Then we giv...
AbstractA general framework for a theory is presented that encompasses both statistical uncertainty,...
summary:In this paper, a general convergence theorem of fuzzy random variables is considered. Using ...
We establish minimal conditions on a fuzzy measure to make the measure convergence a sufficient cond...
DOI
Add to ORKG