Constructing universally small subsets of a given packing index in Polish groups
Abstract
A subset of a Polish space X is called universally small if it belongs to each ccc σ-ideal with Borel base on X. Under CH in each uncountable Abelian Polish group G we construct a universally small subset A0⊂ G such that |A0 gA0|= c for each g∈ G. For each cardinal number ∈[5, c+] the set A0 contains a universally small subset A of G with sharp packing index (A)=\| D|+: D⊂ \gA\g∈ G is disjoint\ equal to .
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