Regularization by noise and stochastic Burgers equations

Abstract

We study a generalized 1d periodic SPDE of Burgers type: ∂t u =- Aθ u + ∂x u2 + Aθ/2 where θ > 1/2, -A is the 1d Laplacian, is a space-time white noise and the initial condition u0 is taken to be (space) white noise. We introduce a notion of weak solution for this equation in the stationary setting. For these solutions we point out how the noise provide a regularizing effect allowing to prove existence and suitable estimates when θ>1/2. When θ>5/4 we obtain pathwise uniqueness. We discuss the use of the same method to study different approximations of the same equation and for a model of stationary 2d stochastic Navier-Stokes evolution.