Every finite subset of an abelian group is an asymptotic approximate group

Abstract

If A is a nonempty subset of an additive group G, then the h-fold sumset is \[ hA = \x1 + ·s + xh : xi ∈ Ai for i=1,2,…, h\. \] The set A is an (r,)-approximate group in G if A is a nonempty subset of a group G and there exists a subset X of G such that |X| ≤ and rA ⊂eq XA. We do not assume that A contains the identity, nor that A is symmetric, nor that A is finite. The set A is an asymptotic (r,)-approximate group if the sumset hA is an (r,)-approximate group for all sufficiently large h. It is proved that every polytope in a real vector space is an asymptotic (r,)-approximate group, that every finite set of lattice points is an asymptotic (r,)-approximate group, and that every finite subset of an abelian group is an asymptotic (r,)-approximate group.