Concentrated sets and the Hurewicz property

Abstract

A set of reals X is b-concentrated if it has cardinality at least b and it contains a countable set D⊂eq X such that each closed subset of X disjoint with D has size smaller than b. We present ZFC results about structures of b-concentrated sets with the Hurewicz covering property using semifilters. Then we show that assuming that the semifilter trichotomy holds, then each b-concentrated set is Hurewicz and even productively Hurewicz. We also show that the appearance of Hurewicz b-concentrated sets under the semifilter trichotomy is somewhat specific and the situation in the Laver model for the consitency of the Borel Conjecture is different.