On the Convergence Rate in the Uniform Ergodic Theorem

Flajolet and Soria established several central limit theorems for the parameter 'number of components' in a wide class of combinatorial structures. In this paper, we shall prove a simple theorem which applies to characterize the convergence rates in their central limit theorems. This theorem is also

Uniform and nonmeasurable versions of some classical ergodic inequalities (all of them going back to the Hopf Yosida Kakutani maximal ergodic theorem) are established. Usually, uniformity involves nonmeasurable suprema and all the technical difficulties arising from this. In the present paper, a sim

Let H=H n =C n \_R denote the Heisenberg group, and let \_ r denote the normalized Lebesgue measure on the sphere [(z, 0): |z| =r]. Let (X, B, m) be a standard Borel probability space on which H acts measurably and ergodically by measure preserving transformations, and let ?(\_ r ) denote the operat