Ergodic averages with prime divisor weights in L1

Abstract

We show that ω (n) and (n), the number of distinct prime factors of n and the number of distinct prime factors of n counted according to multiplicity are good weighting functions for the pointwise ergodic theorem in L1. That is, if g denotes one of these functions and Sg,K=Σn≤ Kg(n) then for every ergodic dynamical system (X, A ,μ, τ ) and every f∈ L1(X) K ∞ 1Sg,KΣn=1K g(n)f( τ nx)=∫Xfdμ for μ a.e. x∈ X. This answers a question raised by C. Cuny and M. Weber who showed this result for Lp, p>1.