A convex optimization approach to the Lyapunov exponents

Abstract

The aim of this paper is to shed more light on some recent ideas about Lyapunov exponents and clarify the formal structures behind these ideas. In particular, we show that the vector of (averaged) Lyapunov exponents of a smooth measure-preserving dynamical system can be regarded as the solution of a vector-valued optimization problem on a space of Riemannian metrics. This result was first formulated and proved by Jairo Bochi in the language of linear cocycles and their conjugacies. We go a step further and prove that the optimization problem is geodesically convex with respect to the L2-metric. Moreover, we derive some consequences of this fact.