Operators with an ergodic power (Q2717543)

For a bounded linear operator \(T\) on a Banach space \(X\), let \(M_n(T)={1\over n}(I+ T+\cdots+ T^{n-1})\) be the Cesàro means. \(T\) is said to be ergodic if for every \(x\in X\), \(\lim_{n\to\infty}{1\over n} T^nx=0\) implies convergence of \(M_n(T)x\). Then it is proved that if some power of \(T\) is ergodic, then \(T\) is ergodic, but the converse is not valid.