Cesaro convergence of spherical averages for measure-preserving actions of Markov semigroups and groups
Abstract
Cesaro convergence of spherical averages is proven for measure-preserving actions of Markov semigroups and groups. Convergence in the mean is established for functions in Lp, 1 p<∞, and pointwise convergence for functions in L∞. In particular, for measure-preserving actions of word hyperbolic groups (in the sense of Gromov) we obtain Cesaro convergence of spherical averages with respect to any symmetric set of generators.
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