A characterization of X for which spaces Cp(X) are distinguished and its applications

Abstract

We prove that the locally convex space Cp(X) of continuous real-valued functions on a Tychonoff space X equipped with the topology of pointwise convergence is distinguished if and only if X is a -space in the sense of Knight. As an application of this characterization theorem we obtain the following results: 1) If X is a Cech-complete (in particular, compact) space such that Cp(X) is distinguished, then X is scattered. 2) For every separable compact space of the Isbell--Mr\'owka type X, the space Cp(X) is distinguished. 3) If X is the compact space of ordinals [0,ω1], then Cp(X) is not distinguished. We observe that the existence of an uncountable separable metrizable space X such that Cp(X) is distinguished, is independent of ZFC. We explore also the question to which extent the class of -spaces is invariant under basic topological operations.