Topological Groups with Strong Disconnectedness Properties

Abstract

Topological groups whose underlying spaces are basically disconnected, F-, or F'-spaces but not P-spaces are considered. It is proved, in particular, that the existence of a Lindel\"of basically disconnected topological group which is not a P-space is equivalent to the existence of a Boolean basically disconnected Lindel\"of group of countable pseudocharacter, that free and free Abelian topological groups of zero-dimensional non-P-spaces are never F'-spaces, and that the existence of a free Boolean F'-group which is not a P-space is equivalent to that of selective ultrafilters on ω.