Haar-smallest sets

Abstract

In this paper we are interested in the following notions of smallness: a subset A of an abelian Polish group X is called Haar-countable/Haar-finite/Haar-n if there are a Borel hull B⊃eq A and a copy C of 2ω such that (C+x) B is countable/finite/of cardinality at most n, for all x∈ X. Recently, Banakh et al. have unified the notions of Haar-null and Haar-meager sets by introducing Haar-I sets, where I is a collection of subsets of 2ω. It turns out that if I is the σ-ideal of countable sets, the ideal of finite sets or the collection of sets of cardinality at most n, then we get the above notions. Moreover, those notions have been studied independently by Zakrzewski (under a different name -- perfectly -small sets). We study basic properties of the corresponding families of small sets, give suitable examples distinguishing them (in all abelian Polish groups of the form R× X) and study σ-ideals generated by compact members of the considered families. In particular, we show that Haar-countable sets do not form an ideal. Moreover, we answer some questions concerning null-finite sets, asked by Banakh and Jabo\'nska, and pose several open problems.