Uniform ergodicity and the one-sided ergodic Hilbert transform
Abstract
Let T be a bounded linear operator on a Banach space X satisfying \|Tn\|/n 0. We prove that T is uniformly ergodic if and only if the one-sided ergodic Hilbert transform HTx:= n∞ Σk=1n k-1Tk x converges for every x ∈ (I-T)X. When T is power-bounded (or more generally (C,α) bounded for some 0< α <1), then T is uniformly ergodic if and only if the domain of HT equals (I-T)X. We then study rotational uniform ergodicity -- uniform ergodicity of every λ T with |λ|=1, and connect it to convergence of the rotated one-sided ergodic Hilbert transform, Hλ Tx. In the Appendix we prove that positive isometries with finite-dimensional fixed space on infinite-dimensional Banach lattices are never uniformly ergodic. In particular, the Koopman operators of ergodic, even non-invertible, probability preserving transformations on standard spaces are never uniformly ergodic.
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