An application of functional equations for generating -invariant measures

Abstract

Let (X, A,μ) be a probability space and let S X X be a measurable transformation. Motivated by the paper of K. Nikodem [Czechoslovak Math. J. 41(116) (4) (1991) 565--569], we concentrate on a functional equation generating measures that are absolutely continuous with respect to μ and -invariant under S. As a consequence of the investigation, we obtain a result on the existence and uniqueness of solutions ∈ L1([0,1]) of the functional equation (x)=Σn=1N|fn'(x)|(fn(x))+g(x), where g∈ L1([0,1]) and f1,…,fN[0,1][0,1] are functions satisfying some extra conditions.