Modulo arithmetic of function spaces: Subset hyperspaces as quotients of function spaces

Abstract

Let X be a (topological) space and Cl(X) the collection of nonempty closed subsets of X. Given a topology on Cl(X), making Cl(X) a space, a (subset) hyperspace of X is a subspace J⊂ Cl(X) with an embedding X, x\x\. In this note, we characterize certain hyperspaces J⊂ Cl(X) as explicit quotient spaces of function spaces F⊂ XY and discuss metrization of associated compact-subset hyperspaces in this setting. In particular, we find that any hyperspace topology containing the Vietoris topology is a quotient of a function space topology containing the topology of pointwise convergence.

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