Packing index of subsets in Polish groups

Abstract

For a subset A of a Polish group G, we study the (almost) packing index ∈dP(A) (resp. P(A)) of A, equal to the supremum of cardinalities |S| of subsets S⊂ G such that the family of shifts \xA\x∈ S is (almost) disjoint (in the sense that |xA yA|<|A| for any distinct points x,y∈ S). Subsets A⊂ G with small (almost) packing index are small in a geometric sense. We show that ∈dP(A)∈ \0,\ for any σ-compact subset A of a Polish group. If A⊂ G is Borel, then the packing indices ∈dP(A) and P(A) cannot take values in the half-interval [(11),) where (11) is a certain uncountable cardinal that is smaller than in some models of ZFC. In each non-discrete Polish Abelian group G we construct two closed subsets A,B⊂ G with ∈dP(A)=∈dP(B)= and P(A B)=1 and then apply this result to show that G contains a nowhere dense Haar null subset C⊂ G with ∈dP(C)=P(C)= for any given cardinal number ∈[4,].