Weakly countably determined spaces of high complexity
Volume 185 / 2008
Studia Mathematica 185 (2008), 291-303
MSC: 46B26, 54H05.
DOI: 10.4064/sm185-3-6
Abstract
We prove that there exist weakly countably determined spaces of complexity higher than coanalytic. On the other hand, we also show that coanalytic sets can be characterized by the existence of a cofinal adequate family of closed sets. Therefore the Banach spaces constructed by means of these families have at most coanalytic complexity.