A mild Girsanov formula

Abstract

We consider a well posed SPDE dZ=(AZ+b(Z)) dt+dW(t),\,Z0=x, on a separable Hilbert space H, where A H H is self-adjoint, negative and such that A-1+β is of trace class for some β>0, b H H is Lipschitz continuous and W is a cylindrical Wiener process on H. We denote by WA(t)=∫0te(t-s)A\,dW(s),\,t∈[0,T], the stochastic convolution. We prove, with the help of a formula for nonlinear transformations of Gaussian integrals due to R. Ramer, the following identity (P Zx-1)() =∫X(h+e· Ax)\, \ -12|γx(h)|2 HQT + I(γx)(h)\ NQT(dh), where NQT is the law of WA in C([0,T],H), HQT its Cameron--Martin space, [γx(k)](t)=∫0t e(t-s)Ab(k(s)+esAx) ds, t∈[0,T], \; k ∈ C([0,T],H) and I(γx) is the It\o integral of γx. Some applications are discussed; in particular, when b is dissipative we provide an explicit formula for the law of the stationary process and the invariant measure of the Markov semigroup (Pt). Some concluding remarks are devoted to a similar problem with colored noise.