A decomposition theorem for fuzzy set-valued random variables and a characterization of fuzzy random translation

Abstract

Let X be a fuzzy set--valued random variable (), and X the family of all fuzzy sets B for which the Hukuhara difference X B exists P--almost surely. In this paper, we prove that X can be decomposed as X(ω)=C Y(ω) for P--almost every ω∈, C is the unique deterministic fuzzy set that minimizes E[d2(X,B)2] as B is varying in X, and Y is a centered (i.e. its generalized Steiner point is the origin). This decomposition allows us to characterize all translation (i.e. X(ω) = M ∈dicator(ω) for some deterministic fuzzy convex set M and some random element in ). In particular, X is an translation if and only if the Aumann expectation EX is equal to C up to a translation. Examples, such as the Gaussian case, are provided.