Non-convergence of some non-commuting double ergodic averages
Abstract
Let S and T be measure-preserving transformations of a probability space (X, B,μ). Let f be a bounded measurable functions, and consider the integrals of the corresponding `double' ergodic averages: \[1nΣi=0n-1 ∫ f(Six)f(Tix)\ dμ(x) (n 1).\] We construct examples for which these integrals do not converge as n∞. These include examples in which S and T are rigid, and hence have entropy zero, answering a question of Frantzikinakis and Host. Our proof begins with a corresponding construction for orthogonal operators on a Hilbert space, and then obtains transformations of a Gaussian measure space from them.
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