Strong q-variation inequalities for analytic semigroups

Abstract

Let T : Lp --> Lp be a positive contraction, with p strictly between 1 and infinity. Assume that T is analytic, that is, there exists a constant K such that Tn-Tn-1 < K/n for any positive integer n. Let q strictly betweeen 2 and infinity and let vq be the space of all complex sequences with a finite strong q-variation. We show that for any x in Lp, the sequence ([Tn(x)](λ))n≥ 0 belongs to vq for almost every λ, with an estimate (Tn(x))n≥ 0Lp(vq)≤ Cxp. If we remove the analyticity assumption, we obtain a similar estimate for the ergodic averages of T instead of the powers of T. We also obtain similar results for strongly continuous semigroups of positive contractions on Lp-spaces.