The characterizations of hyperspaces and free topological groups with an ωω-base
Abstract
A topological space (X, τ) is said to be have an ωω-base if for each point x∈ X there exists a neighborhood base \Uα[x]: α∈ωω\ such that Uβ[x]⊂ Uα[x] for all α≤β in ωω. In this paper, the characterization of a space X is given such that the free Abelian topological group A(X), the hyperspace CL(X) with the Vietoris topology and the hyperspace CL(X) with the Fell topology have ωω-bases respectively. The main results are listed as follows: (1) For a Tychonoff space X, the free Abelian topological group A(X) is a k-space with an ωω-base if and only if X is a topological sum of a discrete space and a submetrizable kω-space. (2) If X is a metrizable space, then (CL(X), τV) has an ωω-base if and only if X is separable and the boundary of each closed subset of X is σ-compact. (3) If X is a metrizable space, then (CL(X), τF) has an ωω-base consisting of basic neighborhoods if and only if X is a Polish space. (4) If X is a metrizable space, then (CL(X), τF) is a Fr\'echet-Urysohn space with an ωω-base, if and only if (CL(X), τF) is first-countable, if and only if X is a locally compact and second countable space.
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