Simultaneous Linearization of Diffeomorphisms of Isotropic Manifolds

Abstract

Suppose that M is a closed isotropic Riemannian manifold and that R1,...,Rm generate the isometry group of M. Let f1,...,fm be smooth perturbations of these isometries. We show that the fi are simultaneously conjugate to isometries if and only if their associated uniform Bernoulli random walk has all Lyapunov exponents zero. This extends a linearization result of Dolgopyat and Krikorian from Sn to real, complex, and quaternionic projective spaces. In addition, we identify and remedy an oversight in that earlier work.