The Josefson--Nissenzweig theorem and filters on ω

Abstract

For a free filter F on ω, endow the space NF=ω\pF\, where pF∈ω, with the topology in which every element of ω is isolated whereas all open neighborhoods of pF are of the form A\pF\ for A∈ F. Spaces of the form NF constitute the class of the simplest non-discrete Tychonoff spaces. The aim of this paper is to study them in the context of the celebrated Josefson--Nissenzweig theorem from Banach space theory. We prove, e.g., that, for a filter F, the space NF carries a sequence μn n∈ω of normalized finitely supported signed measures such that μn(f) 0 for every bounded continuous real-valued function f on NF if and only if F*KZ, that is, the dual ideal F* is Katetov below the asymptotic density ideal Z. Consequently, we get that if F*KZ, then: (1) if X is a Tychonoff space and NF is homeomorphic to a subspace of X, then the space Cp*(X) of bounded continuous real-valued functions on X contains a complemented copy of the space c0 endowed with the pointwise topology, (2) if K is a compact Hausdorff space and NF is homeomorphic to a subspace of K, then the Banach space C(K) of continuous real-valued functions on K is not a Grothendieck space. The latter result generalizes the well-known fact stating that if a compact Hausdorff space K contains a non-trivial convergent sequence, then the space C(K) is not Grothendieck.