Pointwise convergence of some multiple ergodic averages

Abstract

We show that for every ergodic system (X,μ,T1,…,Td) with commuting transformations, the average \[1Nd+1 Σ0≤ n1,…,nd ≤ N-1 Σ0≤ n≤ N-1 f1(T1n Πj=1d Tjnjx)f2(T2n Πj=1d Tjnjx)·s fd(Tdn Πj=1d Tjnjx). \] converges for μ-a.e. x∈ X as N∞. If X is distal, we prove that the average \[1NΣi=0N f1(T1nx)f2(T2nx)·s fd(Tdnx) \] converges for μ-a.e. x∈ X as N∞. We also establish the pointwise convergence of averages along cubical configurations arising from a system commuting transformations. Our methods combine the existence of sated and magic extensions introduced by Austin and Host respectively with ideas on topological models by Huang, Shao and Ye.