Khintchine-type double recurrence in abelian groups

Abstract

We prove a Khintchine-type recurrence theorem for pairs of endomorphisms of a countable discrete abelian group. As a special case of the main result, if is a countable discrete abelian group, , ∈ End(), and - is an injective endomorphism with finite index image, then for any ergodic measure-preserving -system ( X, X, μ, (Tg)g ∈ ), any measurable set A ∈ X, and any > 0, the set of g ∈ for which μ ( A T(g)-1 A T(g)-1 A ) > μ(A)3 - is syndetic. This generalizes the main results of (Ackelsberg--Bergelson--Shalom, 2022) and essentially answers a question left open in that paper (Question 1.12). For the group = Zd, we deduce that for any matrices M1, M2 ∈ Md × d(Z) whose difference M2 - M1 is nonsingular, any ergodic measure-preserving Zd-system ( X, X, μ, (Tn)n ∈ Zd ), any measurable set A ∈ X, and any > 0, the set of n ∈ Zd for which μ ( A TM1 n-1 A TM2 n-1 A ) > μ(A)3 - is syndetic, a result that was previously known only in the case d = 2. The key ingredients in the proof are: (1) a recent result obtained jointly with Bergelson and Shalom that says that the relevant ergodic averages are controlled by a characteristic factor closely related to the quasi-affine (or Conze--Lesigne) factor; (2) an extension trick to reduce to systems with well-behaved (with respect to and ) discrete spectrum; and (3) a description of Mackey groups associated to quasi-affine cocycles over rotational systems with well-behaved discrete spectrum.