Nonstandard Analysis and the sumset phenomenon in arbitrary amenable groups (1211.4208v2)

Abstract: Beiglboeck, Bergelson and Fish proved that if subsets A,B of a countable discrete amenable group G have positive Banach densities a and b respectively, then the product set AB is piecewise syndetic, i.e. there exists k such that the union of k-many left translates of AB is thick. Using nonstandard analysis we give a shorter alternative proof of this result that does not require G to be countable, and moreover yields the explicit bound that k is not greater than 1/ab. We also prove with similar methods that if ${A_i}$ are finitely many subsets of G having positive Banach densities $a_i$ and G is countable, then there exists a subset B whose Banach density is at least the product of the densities $a_i$ and such that the product $BB^{-1}$ is a subset of the intersection of the product sets $A_i A_i^{-1}$. In particular, the latter set is piecewise Bohr.