Large strongly anti-Urysohn spaces exist

Abstract: As defined in [2], a Hausdorff space is strongly anti-Urysohn (in short: SAU) if it has at least two non-isolated points and any two infinite closed subsets of it intersect. Our main result answers the two main questions of [2] by providing a ZFC construction of a locally countable SAU space of cardinality 2 c . The construction hinges on the existence of 2 c weak P-points in ω * , a very deep result of Ken Kunen.It remains open if SAU spaces of cardinality > 2 c could exist, while it was shown in [2] that 2 2… Show more