Extensions of Schreiber's theorem on discrete approximate subgroups in Rd

Abstract

In this paper we give an alternative proof of Schreiber's theorem which says that an infinite discrete approximate subgroup in Rd is relatively dense around a subspace. We also deduce from Schreiber's theorem two new results. The first one says that any infinite discrete approximate subgroup in Rd is a restriction of a Meyer set to a thickening of a linear subspace in Rd, and the second one provides an extension of Schreiber's theorem to the case of the Heisenberg group.