Selective separability on spaces with an analytic topology

J. Camargo, C. Uzcategui

Published 2018-05-25Version 1

We study two form of selective selective separability, $SS$ and $SS^+$, on countable spaces with an analytic topology. We show several Ramsey type properties which imply $SS$. For analytic spaces $X$, $SS^+$ is equivalent to have that the collection of dense sets is a $G_\delta$ subset of $2^X$, and also equivalent to the existence of a weak base which is an $F_\sigma$-subset of $2^X$. We study several examples of analytic spaces.