English

Khintchine-type recurrence for 3-point configurations

Dynamical Systems 2023-02-28 v1 Combinatorics

Abstract

The goal of this paper is to generalize, refine, and improve results on large intersections. We show that if GG is a countable abelian group and φ,ψ:GG\varphi, \psi : G \to G are homomorphisms such that at least two of the three subgroups φ(G)\varphi(G), ψ(G)\psi(G), and (ψφ)(G)(\psi-\varphi)(G) have finite index in GG, then {φ,ψ}\{\varphi, \psi\} has the \emph{large intersections property}. That is, for any ergodic measure preserving system X=(X,X,μ,(Tg)gG)X=(X,\mathcal{X},\mu,(T_g)_{g\in G}), any AXA\in\mathcal{X}, and any ε>0\varepsilon>0, the set {gG:μ(ATφ(g)1ATψ(g)1A)>μ(A)3ε}\{g\in G : \mu(A\cap T_{\varphi(g)}^{-1} A\cap T_{\psi(g)}^{-1}A)>\mu(A)^3-\varepsilon\} is syndetic. Moreover, in the special case where φ(g)=ag\varphi(g)=ag and ψ(g)=bg\psi(g)=bg for a,bZa,b\in\mathbb{Z}, we show that we only need one of the groups aGaG, bGbG, or (ba)G(b-a)G to be of finite index in GG, 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,)G=(\mathbb{Q}_{>0},\cdot) and φ(g)=g\varphi(g)=g, ψ(g)=g2\psi(g)=g^2, which leads to a multiplicative version for the large intersection result of Bergelson-Host-Kra. We also completely characterize the pairs of homomorphisms φ,ψ\varphi,\psi that have the large intersections property when G=Z2G=\mathbb{Z}^2. The proofs of our main results rely on analysis of the structure of the \emph{universal characteristic factor} for the multiple ergodic averages 1ΦNgΦNTφ(g)f1Tψ(g)f2.\frac{1}{|\Phi_N|} \sum_{g\in \Phi_N}T_{\varphi(g)}f_1\cdot T_{\psi(g)} f_2. In the case where GG is finitely-generated, the characteristic factor for such averages is the \emph{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 XX, one can describe the characteristic factor in terms of the \emph{Conze--Lesigne factor} and the σ\sigma-algebras of φ(G)\varphi(G) and ψ(G)\psi(G) invariant functions.

Keywords

Cite

@article{arxiv.2201.03924,
  title  = {Khintchine-type recurrence for 3-point configurations},
  author = {Ethan Ackelsberg and Vitaly Bergelson and Or Shalom},
  journal= {arXiv preprint arXiv:2201.03924},
  year   = {2023}
}

Comments

69 pages, 1 figure

R2 v1 2026-06-24T08:46:22.153Z