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Metric completions, the Heine-Borel property, and approachability
Published 18 Feb 2020 in math.DG, math.CA, and math.LO | (2002.07536v2)
Abstract: We show that the metric universal cover of a plane with a puncture yields an example of a nonstandard hull properly containing the metric completion of a metric space. As mentioned by do Carmo, a nonextendible Riemannian manifold can be noncomplete, but in the broader category of metric spaces it becomes extendible. We give a short proof of a characterisation of the Heine-Borel property of the metric completion of a metric space M in terms of the absence of inapproachable finite points in *M.
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