On the Ck-stable closure of the class of (separable) metrizable spaces

Abstract

Denote by Ck[ M] the Ck-stable closure of the class M of all metrizable spaces, i.e., Ck[ M] is the smallest class of topological spaces that contains M and is closed under taking subspaces, homeomorphic images, countable topological sums, countable Tychonoff products, and function spaces Ck(X,Y) with Lindel\"of domain. We show that the class Ck[ M] coincides with the class of all topological spaces homeomorphic to subspaces of the function spaces Ck(X,Y) with a separable metrizable space X and a metrizable space Y. We say that a topological space Z is Ascoli if every compact subset of Ck(Z) is evenly continuous; by the Ascoli Theorem, each k-space is Ascoli. We prove that the class Ck[ M] properly contains the class of all Ascoli 0-spaces and is properly contained in the class of P-spaces, recently introduced by Gabriyelyan and Kakol. Consequently, an Ascoli space Z embeds into the function space Ck(X,Y) for suitable separable metrizable spaces X and Y if and only if Z is an 0-space.