Basic properties of X for which spaces Cp(X) are distinguished

Abstract

In our paper [18] we showed that a Tychonoff space X is a -space (in the sense of [20], [30]) if and only if the locally convex space Cp(X) is distinguished. Continuing this research, we investigate whether the class of -spaces is invariant under the basic topological operations. We prove that if X ∈ and :X Y is a continuous surjection such that (F) is an Fσ-set in Y for every closed set F ⊂ X, then also Y∈ . As a consequence, if X is a countable union of closed subspaces Xi such that each Xi∈ , then also X∈ . In particular, σ-product of any family of scattered Eberlein compact spaces is a -space and the product of a -space with a countable space is a -space. Our results give answers to several open problems posed in KL. Let T:Cp(X) Cp(Y) be a continuous linear surjection. We observe that T admits an extension to a linear continuous operator T from RX onto RY and deduce that Y is a -space whenever X is. Similarly, assuming that X and Y are metrizable spaces, we show that Y is a Q-set whenever X is. Making use of obtained results, we provide a very short proof for the claim that every compact -space has countable tightness. As a consequence, under Proper Forcing Axiom (PFA) every compact -space is sequential. In the article we pose a dozen open questions.