Entropy and the Uniform Mean Ergodic Theorem for a Family of Sets

Abstract

We define a notion of entropy for an infinite family C of measurable sets in a probability space. We show that the mean ergodic theorem holds uniformly for C under every ergodic transformation if and only if C has zero entropy. When the entropy of C is positive, we establish a strong converse showing that the uniform mean ergodic theorem fails generically in every isomorphism class, including the isomorphism classes of Bernoulli transformations. As a corollary of these results, we establish that every strong mixing transformation is uniformly strong mixing on C if and only if the entropy of C is zero, and obtain a corresponding result for weak mixing transformations.