The Hurewicz dichotomy for generalized Baire spaces

Abstract

By classical results of Hurewicz, Kechris and Saint-Raymond, an analytic subset of a Polish space X is covered by a Kσ subset of X if and only if it does not contain a closed-in-X subset homeomorphic to the Baire space ω ω. We consider the analogous statement (which we call Hurewicz dichotomy) for 11 subsets of the generalized Baire space for a given uncountable cardinal with =<, and show how to force it to be true in a cardinal and cofinality preserving extension of the ground model. Moreover, we show that if the Generalized Continuum Hypothesis (GCH) holds, then there is a cardinal preserving class-forcing extension in which the Hurewicz dichotomy for 11 subsets of holds at all uncountable regular cardinals , while strongly unfoldable and supercompact cardinals are preserved. On the other hand, in the constructible universe L the dichotomy for 11 sets fails at all uncountable regular cardinals, and the same happens in any generic extension obtained by adding a Cohen real to a model of GCH. We also discuss connections with some regularity properties, like the -perfect set property, the -Miller measurability, and the -Sacks measurability.