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Box and Nabla Products that are D-Spaces

Published 19 Nov 2021 in math.GN and math.LO | (2111.10482v1)

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 $\bigcup {U(x) : x \in D}=X$. The box product, $\square X\omega$, is $X\omega$ with topology generated by all $\prod_n U_n$, where every $U_n$ is open. The nabla product, $\nabla X\omega$, is obtained from $\square X\omega$ by quotienting out mod-finite. The weight of $X$, $w(X)$, is the minimal size of a base, while $\mathfrak{d}=\mathop{cof} \omega\omega$. It is shown that there are specific compact spaces $X$ such that $\square X\omega$ and $\nabla X\omega$ are not $D$, but: (1) $\square X\omega$ and $\nabla X\omega$ are hereditarily $D$ if $X$ is scattered and either hereditarily paracompact or of finite scattered height, or if $X$ is metrizable (and $w(X)\le \mathfrak{d}$ for $\square X\omega$); (2) $\nabla X\omega$ is hereditarily $D$ if $X$ is first countable and $w(X)\le \omega_1$, or consistently if $X$ is first countable and $|X|\le \mathfrak{c}$, or $w(X)\le \omega_1$; and (3) $\square X\omega$ is $D$ consistently if $X$ is compact and either first countable or $w(X)\le \omega_1$.

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