A uniform ergodic theorem for some N\"orlund means

Abstract

We obtain a uniform ergodic theorem for the sequence 1s(n) Σk=0n( s)(n-k)\,Tk, where is the inverse of the endomorphism on the vector space of scalar sequences which maps each sequence into the sequence of its partial sums, T is a bounded linear operator on a Banach space and s is a divergent nondecreasing sequence of strictly positive real numbers, such that n→+∞ s(n+1)/s(n)=1 and qs∈1 for some positive integer q. Indeed, we prove that if Tn/s(n) converges to zero in the uniform operator topology, then the sequence of averages above converges in the same topology if and only if 1 is either in the resolvent set of T, or a simple pole of the resolvent function of T.