Mixing implies exponential mixing among codimension one hyperbolic attractors and Anosov flows

Abstract

On a compact manifold of any dimension d≥ 3, we show that joint non-integrability of the stable and unstable foliation of a hyperbolic attractor with one-dimensional expanding direction, for a vector field of class C2, implies exponential mixing with respect to its physical measure. Consequently, the set of Axiom A vector fields which mix exponentially with respect to the physical measure of its non-trivial attractors contains a C1-open and C2-dense subset of the set of all Axiom A vector fields. Moreover, for codimension one C2 Anosov flows in any dimension d≥ 3, if the flow mixes with respect to the unique physical measure, then the flow mixes exponentially, proving the Bowen-Ruelle conjecture in this setting.