On one-point metrizable extensions of locally compact metrizable spaces

Abstract

For a non-compact metrizable space X, let E(X) be the set of all one-point metrizable extensions of X, and when X is locally compact, let EK(X) denote the set of all locally compact elements of E(X) and λ: E(X)→ Z(β X X) be the order-anti-isomorphism (onto its image) defined in: [HJW] M. Henriksen, L. Janos and R.G. Woods, Properties of one-point completions of a non-compact metrizable space, Comment. Math. Univ. Carolinae 46 (2005), 105-123. By definition λ(Y)= n<ωclβ X(Un X) X, where Y=X\p\∈ E(X) and \Un\n<ω is an open base at p in Y. Answering the question of [HJW], we characterize the elements of the image of λ as exactly those non-empty zero-sets of β X which miss X, and the elements of the image of EK(X) under λ , as those which are moreover clopen in β X X. We then study the relation between E(X) and EK(X) and their order structures, and introduce a subset ES(X) of E(X). We conclude with some theorems on the cardinality of the sets E(X) and EK(X), and some open questions.