On the closure of one point sets in \(T0\)-spaces
Abstract
Let X be a set and 2X be a set of all subsets of X. The necessary and sufficient conditions under which a mapping X 2X is a closure of one-point sets in some T0-space (X, τ) are described. It is proved that every T0-Alexandroff space is quasi-metrizable by some equidistant quasi-metric.
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