The aim of this paper is to establish exponential mixing of frame flows for convex cocompact hyperbolic manifolds of arbitrary dimension with respect to the Bowen–Margulis–Sullivan measure. Some immediate applications include an asymptotic formula for matrix coefficients with an exponential error term as well as the exponential equidistribution of holonomy of closed geodesics. The main technical result is a spectral bound on transfer operators twisted by holonomy, which we obtain by building on Dolgopyat's method.
Abstract
Let f be a Hénon–Sibony map, also known as a regular polynomial automorphism of
$\mathbb {C}^k$
, and let
$\mu $
be the equilibrium measure of f. In this paper we prove that
$\mu $
is exponentially mixing for plurisubharmonic observables.
Exponential mixing of frame flows for convex cocompact hyperbolic manifolds