On Borel σ-algebras of topologies generated by two-point selections

Abstract

A two-point selection on a set X is a function f:[X]2 X such that f(F) ∈ F for every F ∈ [X]2. It is known that every two-point selection f:[X]2 X induced a topology τf on X by using the relation: x ≤ y if either f(\x,y\) = x or x = y, for every x, y ∈ X. We are mainly concern with the two-point selections on the real line R. In this paper, we study the σ-algebras of Borel, each one denoted by Bf(R), of the topologies τf's defined by a two-point selection f on R. We prove that the assumption c = 2< c implies the existence of a family \ f : < 2c \ of two-point selections on R such that Bfμ(R) ≠ Bf(R) for distinct μ, < 2c. By assuming that c = 2< c and c is regular, we also show that there are 22c many σ-algebras on R that contain [R]≤ ω and none of them is the σ-algebra of Borel of τf for any two-point selection f: [R]2 R. Several examples are given to illustrate some properties of these Borel σ-algebras.