Pointwise Convergence of Ergodic Averages in Orlicz Spaces

Abstract

We show that for each Orlicz space properly contained in L1 there is a sequence along which the ergodic averages converge for functions in the Orlicz space, but diverge for all f in L1. This extends the work of K. Reinhold, who, building on the work of A. Bellow,constructed a sequence for which the averages converge a.e. for every f in Lp, p>q, but diverge for some f in Lq. Our method, introduced by Bellow and extended by Reinhold and M. Wierdl, is perturbation.