O-segments on topological measure spaces

Abstract

Let X be a topological space and μ be a nonatomic finite measure on a σ-algebra containing the Borel σ-algebra of X. We say μ is weakly outer regular, if for every A ∈ and ε>0, there exists an open set O such that μ(A O)=0 and μ(O A)<ε. The main result of this paper is to show that if f,g ∈ L1(X,, μ) with ∫X f dμ=∫X g dμ=1, then there exists an increasing family of open sets u(t), t∈ [0,1], such that u(0)=, u(1)=X, and ∫u(t) f dμ=∫u(t) g dμ=t for all t∈ [0,1]. We also study a similar problem for a finite collection of integrable functions on general finite and σ-finite nonatomic measure spaces.