On sequences of finitely supported measures related to the Josefson--Nissenzweig theorem

Abstract

Given a Tychonoff space X, we call a sequence μn n∈ω of signed Borel measures on X a finitely supported Josefson--Nissenzweig sequence (in short a JN-sequence) if: 1) for every n∈ω the measure μn is a finite combination of one-point measures and \|μn\|=1, and 2) ∫Xf\,dμn0 for every continuous function f∈ C(X). Our main result asserts that if a Tychonoff space X admits a JN-sequence, then there exists a JN-sequence μn n∈ω such that: i) supp(μn)supp(μk)= for every n≠ k∈ω, and ii) the union n∈ωsupp(μn) is a discrete subset of X. We also prove that if a Tychonoff space X carries a JN-sequence, then either there is a JN-sequence μn n∈ω on X such that |supp(μn)|=2 for every n∈ω, or for every JN-sequence μn n∈ω on X we have n∞|supp(μn)|=∞.