Some analogies between Haar meager sets and Haar null sets in abelian Polish groups

Abstract: In the paper we would like to pay attention to some analogies between Haar meager sets and Haar null sets. Among others, we will show that 0 ∈ int (A− A) for each Borel set A, which is not Haar meager in an abelian Polish group. Moreover, we will give an example of a Borel non-Haar meager set A ⊂ c 0 such that int (A + A) = ∅. Finally, we will define D-measurability as a topological analog of Christensen measurability, and apply our generalization of Piccard's theorem to prove that each D-measurable homomorphi… Show more

“…Theorem 2]; see also [5]) and Haar meager (see [10]), and, as expected, the reason is the same in both cases: If A is a Borel subset of an abelian Polish group which is non-Haar null or non-Haar meager, then A − A contains an open neighborhood of 0. (To complete the argument, it suffices to observe that if A is compact, so is A − A.…”

Haar meager sets revisited

“…Theorem 2]; see also [5]) and Haar meager (see [10]), and, as expected, the reason is the same in both cases: If A is a Borel subset of an abelian Polish group which is non-Haar null or non-Haar meager, then A − A contains an open neighborhood of 0. (To complete the argument, it suffices to observe that if A is compact, so is A − A.…”

Haar meager sets revisited

“…These results clearly correlate to the analogous well known results concerning Haar null sets proved by Christensen in [3]. Other similarities of the σ-ideals of Haar meager sets and of Haar null sets were investigated in [4] and [2]. We should note that it is not known whether every (naively) Haar meager set is (naively) strongly Haar meager.…”

“…Then we show if G is either the symmetric group S ∞ or any non-locally compact Polish group with a translation invariant metric then all compact subsets of G satisfy this sufficient condition, and thus they are strongly Haar meager. This improves the result by Jab lońska who proved that every compact subset of a non-locally compact abelian Polish group is Haar meager [4].…”

Haar meager sets, their hulls, and relationship to compact sets

“…Analogously to the left-Haar-null sets, define in G the family of left-Haarmeagre sets, HM(G), to comprise the sets M coverable by a universally Baire set B for which there are a compact Hausdorff space K and a continuous f : K → G with f −1 (gB) meagre in K for all g ∈ G. These were introduced, in the abelian Polish group setting with K metrizable, by Darji [Dar], cf. [Jab1], and shown there to form a σ-ideal of meagre sets (co-extensive with the meagre sets for G locally compact); as HM(G)⊆ B 0 (G), the family is not studied here. 9.…”

Beyond Lebesgue and Baire IV: Density topologies and a converse Steinhaus–Weil theorem