A perturbation result for quasi-linear stochastic differential equations in UMD Banach spaces

Abstract

We consider the effect of perturbations to a quasi-linear parabolic stochastic differential equation set in a UMD Banach space X. To be precise, we consider perturbations of the linear part, i.e. the term concerning a linear operator A generating an analytic semigroup. We provide estimates for the difference between the solution to the original equation U and the solution to the perturbed equation U0 in the Lp(;C([0,T];X))-norm. In particular, this difference can be estimated || R(λ:A)-R(λ:A0) || for sufficiently smooth non-linear terms. The work is inspired by the desire to prove convergence of space discretization schemes for such equations. In this article we prove convergence rates for the case that A is approximated by its Yosida approximation, and in a forthcoming publication we consider convergence of Galerkin and finite-element schemes in the case that X is a Hilbert space.