Ergodic properties of equilibrium measures for smooth three dimensional flows
Abstract
Let \Tt\ be a smooth flow with positive speed and positive topological entropy on a compact smooth three dimensional manifold, and let μ be an ergodic measure of maximal entropy. We show that either \Tt\ is Bernoulli, or \Tt\ is isomorphic to the product of a Bernoulli flow and a rotational flow. Applications are given to Reeb flows.
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