Uniquely universal sets in R × ω and [0,1] × ω

Abstract

Let X and Y be topological spaces. We say that X× Y satisfies the Uniquely Universal property (UU) iff there exists an open set U⊂eq X× Y such that for every open set W⊂eq Y there is a unique cross section of U with U( x) =\ y∈ Y:( x,y) ∈ U\ =W. Arnold W. Miller in his paper 1 posed the following two questions: 1. Does [ 0,1] × ω have UU? 2. Does R × ω have UU? In this paper we present two constructions which give positive answers to both problems.