Convergence of sequences of fuzzy random variables and its application

Using the compactness in large deviation theory, this note describes a large deviation upper bound by a lower semicontinuous function. It then obtains a characterization for exponential convergence and discusses exponential convergence rates.

The fuzzy set was introduced by Zadeh (1965) and the concept of fuzzy random variables was provided by Kwakernaak (1981). Sequences of independent and identical distributed fuzzy random variables were considered by Kruse (1982). He also showed the strong law of large numbers for fuzzy random variabl

In this paper, an O-convergence theory of fuzzy nets is built in L-topological spaces by means of neighborhoods of fuzzy points. It has many nice properties. It can be used to characterize the closed set, open set, T 2 separation axiom and fuzzy compactness.

In this paper, we study Q-convergence and Q\*-convergence of ideals in fuzzy lattices by the concept of Q-remoteneighborhood. Then we introduce the strong S-irresoluteness, S\*-irresoluteness and S\*-strong semicontinuity on fuzzy lattices. We also study some properties of the notions above and stro