The Gaussian structure of a perturbed KPZ

Abstract

We study the KPZ equation on a circle with an additive spatial perturbation ∂t h=12Δh+12|∇ h|2+ξ+ V, where ξ is a spacetime white noise and V is a smooth spatial function. When V=0, it is well-known that the unique invariant measure is the Brownian bridge. In the presence of the perturbation, we show that the equation admits a unique invariant measure that is absolutely continuous with respect to the Brownian bridge. We further prove the measure has a finite relative entropy with respect to the law of the bridge and that, for any p∈(1,∞), the corresponding Radon-Nikodym derivative belongs to Lp, provided that ∫ V2 is sufficiently small. The proof uses the discretization and mollification scheme of FQ, together with an application of the log-Sobolev and spectral gap inequalities for the underlying Gaussian measure.