Low complexity Haar null sets without Gδ hulls in Zω
Abstract
We show that for every 2 <ω1 there exists a Haar null set in Zω that is the difference of two 0 sets but not contained in any 0 Haar null set. In particular, there exists a Haar null set in Zω that is the difference of two Gδ sets but not contained in any Gδ Haar null set. This partially answers a question of M. Elekes and Z. Vidny\'anszky. To prove this, we also prove a theorem which characterizes the Haar null subsets of Zω.
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