Rapid mixing and superpolynomial equidistribution for torus extensions of hyperbolic flows

Abstract

In this paper, we study mixing rates for Td-extensions of hyperbolic flows. Given three closed orbits with their holonomies, we can relate them to a point in Rd+1. We prove that the extension flow enjoys rapid mixing, if the associated point is an inhomogeneously Diophantine number. Under the same assumption, we also obtain the superpolynomial equidistribution, namely, a superpolynomial error term in the equidistribution of the holonomy around closed orbits. Lastly, we apply these results to a class of three-dimensional frame flows.

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