On linear continuous operators between distinguished spaces Cp(X)

Abstract

As proved in [16], for a Tychonoff space X, a locally convex space Cp(X) is distinguished if and only if X is a -space. If there exists a linear continuous surjective mapping T:Cp(X) Cp(Y) and Cp(X) is distinguished, then Cp(Y) also is distinguished [17]. Firstly, in this paper we explore the following question: Under which conditions the operator T:Cp(X) Cp(Y) above is open? Secondly, we devote a special attention to concrete distinguished spaces Cp([1,α]), where α is a countable ordinal number. A complete characterization of all Y which admit a linear continuous surjective mapping T:Cp([1,α]) Cp(Y) is given. We also observe that for every countable ordinal α all closed linear subspaces of Cp([1,α]) are distinguished, thereby answering an open question posed in [17]. Using some properties of -spaces we prove that a linear continuous surjection T:Cp(X) Ck(X)w, where Ck(X)w denotes the Banach space C(X) endowed with its weak topology, does not exist for every infinite metrizable compact C-space X (in particular, for every infinite compact X ⊂ Rn).