On the differentiability of solutions to singularly perturbed SPDEs

Abstract

We consider semilinear stochastic evolution equations on Hilbert spaces with multiplicative Wiener noise and linear drift term of the type A + G, with A and G maximal monotone operators and a "small" parameter, and study the differentiability of mild solutions with respect to . The operator G can be a singular perturbation of A, in the sense that its domain can be strictly contained in the domain of A.