Oscillation and the mean ergodic theorem for uniformly convex Banach spaces

Abstract

Let B be a p-uniformly convex Banach space, with p >= 2. Let T be a linear operator on B, and let An x denote the ergodic average (1 / n) sumi< n Tn x. We prove the following variational inequality in the case where T is power bounded from above and below: for any increasing sequence (tk)k in N of natural numbers we have sumk || Atk+1 x - Atk x ||p <= C || x ||p, where the constant C depends only on p and the modulus of uniform convexity. For T a nonexpansive operator, we obtain a weaker bound on the number of epsilon-fluctuations in the sequence. We clarify the relationship between bounds on the number of epsilon-fluctuations in a sequence and bounds on the rate of metastability, and provide lower bounds on the rate of metastability that show that our main result is sharp.