Uniform Weighted Averages and a Conjecture of Bergelson, Moreira, and Richter

Abstract

We confirm a conjecture posed by Bergelson, Moreira, and Richter (arXiv:1711.05729), and in particular show that for every probability measure preserving system (X,B,μ,T), every k∈ N, every set A∈ B with μ(A)>0, and every tempered function f, \[ N∞1NΣn=1Nμ(A T-f(n)A T-f(n+1)A ·s T-f(n+k)A)>0. \] This is achieved by establishing conditions on an increasing function W:N→ (0,∞) such that if (xn)n∈ N is a bounded sequence in a Banach space with \[ W(N)-W(M)∞1W(N)-W(M)Σn=MN (W(n)-W(n-1))xn =L \] then the limit of Ces\`aro averages of (xn)n∈ N, N∞1NΣn=1Nxn is also equal to L. Furthermore, the methods we develop can be used to sharpen some of the combinatorial results obtained by Bergelson, Moreira, and Richter. For example, if E is a set of positive upper density, then for any k∈ N, any ε>0, and all sufficiently large N∈ N there is an n∈ [N-N1/2+ε,N] such that \[\a,a+n3/2,a+(n+1)3/2,… ,a +(n+k)3/2\⊂eq E. \]