Large deviations for Brownian motion in evolving Riemannian manifolds

Abstract

We prove large deviations for g(t)-Brownian motion in a complete, evolving Riemannian manifold M with respect to a collection \g(t)\t∈ [0,1] of Riemannian metrics, smoothly depending on t. We show how the large deviations are obtained from the large deviations of the (time-dependent) horizontal lift of g(t)-Brownian motion to the frame bundle FM over M. The latter is proved by embedding the frame bundle into some Euclidean space and applying Freidlin-Wentzell theory for diffusions with time-dependent coefficients, where the coefficients are jointly Lipschitz in space and time.