An optimal regularity result for Kolmogorov equations and weak uniqueness for some critical SPDEs

Abstract

We show uniqueness in law for the critical SPDE dXt = AXt dt + (-A)1/2F(X(t))dt + dWt,\;\; X0 =x ∈ H, where A : dom(A) ⊂ H H is a negative definite self-adjoint operator on a separable Hilbert space H having A-1 of trace class and W is a cylindrical Wiener process on H. Here F: H H can be continuous with at most linear growth (some functions F which grow more than linearly can also be considered). This leads to new uniqueness results for generalized stochastic Burgers' equations and for three-dimensional stochastic Cahn-Hilliard type equations which have interesting applications. To get weak uniqueness we also establish a new optimal regularity result for the Kolmogorov equation λ u - Lu = f on H, where λ >0, f: H R is Borel and bounded and L is the Ornstein-Uhlenbeck operator related to the SPDE when F=0. In particular we show that the first derivative Du : H H verifies Du(x) ∈ dom((-A)1/2), for any x ∈ H, and moreover x ∈ H |(-A)1/2Du (x)|H = \| (-A)1/2Du \|0 C \, \| f\|0.