The Cp-stable closure of the class of separable metrizable spaces

Abstract

Denote by Cp[ M0] the Cp-stable closure of the class M0 of all separable metrizable spaces, i.e., Cp[ M0] is the smallest class of topological spaces that contains M0 and is closed under taking subspaces, homeomorphic images, countable topological sums, countable Tychonoff products, and function spaces Cp(X,Y). Using a recent deep result of Chernikov and Shelah (2014), we prove that Cp[ M0] coincides with the class of all Tychonoff spaces of cardinality strictly less than ω1. Being motivated by the theory of Generalized Metric Spaces, we characterize also other natural Cp-type stable closures of the class M0.