Optimal lower bounds for multiple recurrence

Abstract

Let (X, B,μ,T) be an ergodic measure preserving system, A ∈ B and ε>0. We study the largeness of sets of the form equation* split S = \ n∈Nμ(A T-f1(n)A T-f2(n)A… T-fk(n)A)> μ(A)k+1 - ε \ split equation* for various families \f1,…,fk\ of sequences fi N N. For k ≤ 3 and fi(n)=i f(n), we show that S has positive density if f(n)=q(pn) where q ∈ Z[x] satisfies q(1) or q(-1) =0 and pn denotes the n-th prime; or when f is a certain Hardy field sequence. If Tq is ergodic for some q ∈ N, then for all r ∈ Z, S is syndetic if f(n) = qn + r. For fi(n)=ain, where ai are distinct integers, we show that S can be empty for k≥ 4, and for k = 3 we found an interesting relation between the largeness of S and the abundance of solutions to certain linear equations in sparse sets of integers. We also provide some partial results when the fi are distinct polynomials.