Temporal approximation of stochastic evolution equations with irregular nonlinearities

Abstract

In this paper, we prove convergence for contractive time discretisation schemes for semi-linear stochastic evolution equations with irregular Lipschitz nonlinearities, initial values, and additive or multiplicative Gaussian noise on 2-smooth Banach spaces X. The leading operator A is assumed to generate a strongly continuous semigroup S on X, and the focus is on non-parabolic problems. The main result concerns convergence of the uniform strong error Ek∞ := (E j∈ \0, …, Nk\ \|U(tj) - Uj\|Xp)1/p 0 (k 0), where p ∈ [2,∞), U is the mild solution, Uj is obtained from a time discretisation scheme, k is the step size, and Nk = T/k for final time T>0. This generalises previous results to a larger class of admissible nonlinearities and noise, as well as rough initial data from the Hilbert space case to more general spaces. We present a proof based on a regularisation argument. Within this scope, we extend previous quantified convergence results for more regular nonlinearity and noise from Hilbert to 2-smooth Banach spaces. The uniform strong error cannot be estimated in terms of the simpler pointwise strong error Ek := (j∈ \0,…,Nk\E \|U(tj) - Uj\|Xp)1/p, which most of the existing literature is concerned with. Our results are illustrated for a variant of the Schr\"odinger equation, for which previous convergence results were not applicable.