On semilinear sets and asymptotically approximate groups

Abstract

Let G be any group and A be an arbitrary subset of G (not necessarily symmetric and not necessarily containing the identity). The h-fold product set of A is defined as Ah := a1.a2...ah : a1,…,an ∈ A . Nathanson considered the concept of an asymptotic approximate group. Let r,l ∈ N. The set A is said to be an (r,l) approximate group in G if there exists a subset X in G such that |X|≤slant l and Ar⊂eq XA. The set A is an asymptotic (r,l)-approximate group if the product set Ah is an (r,l)-approximate group for all sufficiently large h. Recently, Nathanson showed that every finite subset A of an abelian group is an asymptotic (r,l') approximate group (with the constant l' explicitly depending on r and A). We generalise the result and show that, in an arbitrary abelian group G, the union of k (unbounded) generalised arithmetic progressions is an asymptotic (r,(4rk)k)-approximate group.