On the structure of completions of function spaces in Hausdorff uniformity (Q1345669)

For an infinite compact space \(X\), \(C_ H(X)\) denotes the completion of \(C(X)\) endowed with the subspace uniformity of the hyperspace of compact sets in \(X \times \mathbb{R}\) (in the Hausdorff uniformity). The author proves that \(C_ H (X)\) is locally connected iff \(X\) is locally connected. If all the accumulation points of \(X\) form a locally connected subspace of \(X\), then \(C_ H(X)\) is described as a set of certain upper semicontinuous multivalued mappings.