Khintchine-type recurrence for 3-point configurations

Abstract

The goal of this paper is to generalize, refine, and improve results on large intersections. We show that if G is a countable abelian group and , : G G are homomorphisms such that at least two of the three subgroups (G), (G), and (-)(G) have finite index in G, then \, \ has the large intersections property. That is, for any ergodic measure preserving system X=(X,X,μ,(Tg)g∈ G), any A∈X, and any >0, the set \g∈ G : μ(A T(g)-1 A T(g)-1A)>μ(A)3-\ is syndetic. Moreover, in the special case where (g)=ag and (g)=bg for a,b∈Z, we show that we only need one of the groups aG, bG, or (b-a)G to be of finite index in G, and we show that the property fails in general if all three groups are of infinite index. One particularly interesting case is where G=(Q>0,·) and (g)=g, (g)=g2, which leads to a multiplicative version for the large intersection result of Bergelson-Host-Kra. We also completely characterize the pairs of homomorphisms , that have the large intersections property when G=Z2. The proofs of our main results rely on analysis of the structure of the universal characteristic factor for the multiple ergodic averages 1|N| Σg∈ NT(g)f1· T(g) f2. In the case where G is finitely-generated, the characteristic factor for such averages is the Kronecker factor. In this paper, we study actions of groups that are not necessarily finitely-generated, showing in particular that by passing to an extension of X, one can describe the characteristic factor in terms of the Conze--Lesigne factor and the σ-algebras of (G) and (G) invariant functions.