Box and Nabla Products that are D-Spaces

Abstract

A space X is D if for every assignment, U, of an open neighborhood to each point x in X there is a closed discrete D such that \U(x) : x ∈ D\=X. The box product, Xω, is Xω with topology generated by all Πn Un, where every Un is open. The nabla product, ∇ Xω, is obtained from Xω by quotienting out mod-finite. The weight of X, w(X), is the minimal size of a base, while d=cof ωω. It is shown that there are specific compact spaces X such that Xω and ∇ Xω are not D, but: (1) Xω and ∇ Xω are hereditarily D if X is scattered and either hereditarily paracompact or of finite scattered height, or if X is metrizable (and w(X) d for Xω); (2) ∇ Xω is hereditarily D if X is first countable and w(X) ω1, or consistently if X is first countable and |X| c, or w(X) ω1; and (3) Xω is D consistently if X is compact and either first countable or w(X) ω1.