Large deviations principle for invariant measures of stochastic Burgers equations

Abstract

We study the small noise asymptotic for stochastic Burgers equations on (0,1) with Dirichlet boundary condition. We consider the case that the noise is more singular than space-time white noise. We let the noise magnitude ε → 0 and the covariance operator Qε is convergent to (-) 1 2 and prove a large deviations principle for solutions, uniformly with respect to the initial value of equation. Furthermore, we set Qε to be a trace class operator and converge to (-)α2 with α<1 in a suitable way such that the invariant measures exist. Then, we prove the large deviations principle for the invariant measures of stochastic Burgers equations.