Almost everywhere convergence of convolution products

Abstract

Let (X,B,m,τ) be a dynamical system with (X,B,m) a probability space and τ an invertible, measure preserving transformation. The present paper deals with the almost everywhere convergence in L1(X) of a sequence of operators of weighted averages. Almost everywhere convergence follows once we obtain an appropriate maximal estimate and once we provide a dense class where convergence holds almost everywhere. The weights are given by convolution products of members of a sequence of probability measures \i\ defined on . We then exhibit cases of such averages, where convergence fails.