Almost everywhere convergence of ergodic series

Abstract

We consider ergodic series of the form Σn=0∞ an f(Tn x) where f is an integrable function with zero mean value with respect to a T-invariant measure μ. Under certain conditions on the dynamical system T, the invariant measure μ and the function f, we prove that the series converges μ-almost everywhere if and only if Σn=0∞ |an|2<∞, and that in this case the sum of the convergent series is exponentially integrable and satisfies a Khintchine type inequality. We also prove that the system \f Tn\ is a Riesz system if and only if the spectral measure of f is absolutely continuous with respect to the Lebesgue measure and the Radon-Nikodym derivative is bounded from above as well as from below by a constant. We check the conditions for Gibbs measures μ relative to hyperbolic dynamics T and for H\"older functions f. An application is given to the study of differentiability of the Weierstrass type functions Σn=0∞ an f(3n x).