The topological classification of spaces of metrics with the uniform convergence topology
Abstract
For a metrizable space X of density , let PM(X) be the space of continuous bounded pseudometrics on X endowed with the uniform convergence topology. In this paper, its topology shall be classified as follows: (i) If X is finite, then PM(X) is homeomorphic to \0\ when X is a singleton, and then PM(X) is homeomorphic to [0,1]( - 1)/2 - 1 × [0,1) when > 1; (ii) If X is infinite and generalized compact, then PM(X) is homeomorphic to the Hilbert space 2(2< ) of density 2< ; (iii) If X is not generalized compact, then PM(X) is homeomorphic to the Hilbert space 2(2) of density 2. Furthermore, letting M(X) and AM(X) be the spaces of continuous bounded metrics and bounded admissible metrics on X with the subspace topology of PM(X) respectively, we will recognize their topological types as follows: (iv) If X is infinite and compact, then M(X) (= AM(X)) is homeomorphic to the separable Hilbert space 2; (v) In the case that X is not compact, M(X) is homeomorphic to the Hilbert space 2(20) if X is σ-compact, and moreover AM(X) is also homeomorphic to the Hilbert space 2(20) if X is separable locally compact.
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