Weakly separated spaces and Pixley-Roy hyperspaces

Abstract

In this paper we obtain new results regarding the chain conditions in the Pixley-Roy hyperspaces F[X]. For example, if c(X) and R(X) denote the cellularity and weak separation number of X (see Section~[4]) and we define the cardinals c* (X) := \c(Xn) : n∈ N\ and R*(X) := \R(Xn) : n∈ N\, then we show that R*(X) = c *(F[X]). On the other hand, in "M. Sakai, Cardinal functions of Pixley-Roy hyperspaces, Topol. Appl., 159 (2012), 3080--3088." Sakai asked whether the fact that F[X] is weakly Lindel\"of implies that X is hereditarily separable and proved that if X is countably tight then the previous question has an affirmative answer. We shall expand Sakai's result by proving that if F[X] is weakly Lindel\"of and X is a Hausdorff k-space; or X is a countably tight T1 space; or X is weakly separated, then X is hereditarily separable.