ωω-Dominated function spaces and ωω-bases in free objects of Topological Algebra
Abstract
A topological space X is defined to have an ωω-base if at each point x∈ X the space X has a neighborhood base (Uα[x])α∈ωω such that Uβ[x]⊂ Uα[x] for all αβ in ωω. We characterize topological and uniform spaces whose free (locally convex) topological vector spaces or free (Abelian or Boolean) topological groups have ωω-bases.
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