Ljubomir B. Ćirić,¹ Jeong S. Ume,² and Siniša N. Ješić³

Copyright © 2006 Ljubomir B. Ćirić et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let (X,d) be a Polish space, CB(X) the family of all nonempty closed and bounded subsets of X, and (Ω,Σ) a measurable space. A pair of a hybrid measurable mappings f:Ω×X→X and T:Ω×X→CB(X), satisfying the inequality (1.2), are introduced and investigated. It is proved that if X is complete, T(ω,⋅), f(ω,⋅) are continuous for all ω∈Ω, T(⋅,x), f(⋅,x) are measurable for all x∈X, and f(ω×X)=X for each ω∈Ω, then there is a measurable mapping ξ:Ω→X such that f(ω,ξ(w))∈T(ω,ξ(w)) for all ω∈Ω. This result generalizes and extends the fixed point theorem of Papageorgiou (1984) and many classical fixed point theorems.