Multiple ergodic averages in abelian groups and Khintchine type recurrence

Abstract

Let G be a countable abelian group. We study ergodic averages associated with configurations of the form \ag,bg,(a+b)g\ for some a,b∈Z. Under some assumptions on G, we prove that the universal characteristic factor for these averages is a factor of a 2-step nilpotent homogeneous space. As an application we derive a Khintchine type recurrence result. In particular, we prove that for every countable abelian group G, if a,b∈Z are such that aG,bG,(b-a)G and (a+b)G are of finite index in G, then for every E⊂ G and >0 the set \g∈ G : d(E E-ag E-bg E-(a+b)g)≥ d(E)4-\ is syndetic. This generalizes previous results for G=Z, G=Fpω and G=p∈ PFp by Bergelson Host and Kra, Bergelson Tao and Ziegler and the author, respectively.