Long-term properties of finite-correlation time isotropic stochastic systems

Abstract

We consider finite-dimensional systems of linear stochastic differential equations ∂txk( t ) = Akp( t )xp( t ), A(t) being a stationary continuous statistically isotropic stochastic process with values in real d × d matrices. We suppose also that the laws of A(t) satisfy the large deviation principle. For these systems, we find exact expressions for the Lyapunov and generalized Lyapunov exponents and show that they are determined in a precise way only by the rate function of the diagonal elements of A.