Decompositions of set-valued mappings

Abstract

Let X be a set, BX denotes the family of all subsets of X and F: X BX be a set-valued mapping such that x ∈ F(x), supx∈ X | F(x)|< , supx∈ X | F-1(x)|< for all x∈ X and some infinite cardinal . Then there exists a family F of bijective selectors of F such that |F|< and F(x) = \ f(x): f∈F\ for each x∈ X. We apply this result to G-space representations of balleans.