On -spaces

Abstract

-spaces have been defined by a natural generalization of a classical notion of -sets of reals to Tychonoff topological spaces; moreover, the class of all -spaces consists precisely of those X for which the locally convex space Cp(X) is distinguished. The aim of this article is to better understand the boundaries of the class , by presenting new examples and counter-examples. 1) We examine when trees considered as topological spaces equipped with the interval topology belong to . In particular, we prove that no Souslin tree is a -space. Other main results are connected with the study of 2) -spaces built on maximal almost disjoint families of countable sets; and 3) Ladder system spaces. It is consistent with CH that all ladder system spaces on ω1 are in . We show that in forcing extension of ZFC obtained by adding one Cohen real, there is a ladder system space on ω1 which is not in . We resolve several open problems posed in the literature.