On the homogeneous ergodic bilinear averages with M\"obius and liouville weights

Abstract

It is shown that the homogeneous ergodic bilinear averages with M\"obius or Liouville weight converge almost surely to zero, that is, if T is a map acting on a probability space (X,A,μ), and a,b ∈ Z, then for any f,g ∈ L2(X), for almost all x ∈ X, 1NΣn=1N (n) f(Tanx) g(Tbnx) 0, as N +∞, where is the Liouville function or the M\"obius function. We further obtain that the convergence almost everywhere holds for the short interval with the help of Zhan's estimation. Also our proof yields a simple proof of Bourgain's double recurrence theorem. Moreover, we establish that if T is weakly mixing and its restriction to its Pinsker algebra has singular spectrum, then for any integer k ≥ 1, for any fj∈ L∞(X), j=1,·s,k, for almost all x ∈ X, we have 1N Σn=1N (n) Πj=1kfj(Tjnx) 0, as N +∞, where Tj are some powers of T, j=1,·s,k.