Almost everywhere convergence of entangled ergodic averages

Abstract

We study pointwise convergence of entangled averages of the form \[ 1NkΣ1≤ n1,…, nk≤ N Tmnα(m)Am-1Tnα(m-1)m-1… A2T2nα(2)A1T1nα(1) f, \] where f∈ L2(X,μ), α:\1,…,m\\1,…,k\, and the Ti are ergodic measure preserving transformations on the standard probability space (X,μ). We show that under some joint boundedness and twisted compactness conditions on the pairs (Ai,Ti), almost everywhere convergence holds for all f∈ L2. We also present results for the general Lp case (1≤ p<∞) and for polynomial powers, in addition to continuous versions concerning ergodic flows.