The topological type of spaces consisting of certain metrics on locally compact metrizable spaces with the compact-open topology

Abstract

For a separable locally compact but not compact metrizable space X, let α X = X \x∞\ be the one-point compactification with the point at infinity x∞. We denote by EM(X) the space consisting of admissible metrics on X, which can be extended to an admissible metric on α X, endowed with the compact-open topology. Let c0 ⊂ (0,1)N be the space of sequences converging to 0. In this paper, we shall show that if X is separable, locally connected and locally compact but not compact, and there exists a sequence \Ci\ of connected sets in X such that for all positive integers i, j ∈ N with |i - j| ≤ 1, Ci Cj ≠ , and for each compact set K ⊂ X, there is a positive integer i(K) ∈ N such that for any i ≥ i(K), Ci ⊂ X K, then EM(X) is homeomorphic to c0.