(Uniform) Convergence of Twisted Ergodic Averages

Abstract

Let T be an ergodic measure-preserving transformation on a non-atomic probability space (X,,μ). We prove uniform extensions of the Wiener-Wintner theorem in two settings: For averages involving weights coming from Hardy field functions, p: \[ \1N Σn≤ N e(p(n)) Tnf(x) \ \] and for "twisted" polynomial ergodic averages: \[ \1N Σn≤ N e(n θ) TP(n)f(x) \ \] for certain classes of badly approximable θ ∈ [0,1]. We also give an elementary proof that the above twisted polynomial averages converge pointwise μ-a.e. for f ∈ Lp(X), \ p >1, and arbitrary θ ∈ [0,1].