English

Temporal approximation of stochastic evolution equations with irregular nonlinearities

Numerical Analysis 2024-05-13 v2 Numerical Analysis Analysis of PDEs Functional Analysis Probability

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 22-smooth Banach spaces XX. The leading operator AA is assumed to generate a strongly continuous semigroup SS on XX, and the focus is on non-parabolic problems. The main result concerns convergence of the uniform strong error Ek:=(Esupj{0,,Nk}U(tj)UjXp)1/p0(k0),E_{k}^{\infty} := \Big(\mathbb{E} \sup_{j\in \{0, \ldots, N_k\}} \|U(t_j) - U^j\|_X^p\Big)^{1/p} \to 0\quad (k \to 0), where p[2,)p \in [2,\infty), UU is the mild solution, UjU^j is obtained from a time discretisation scheme, kk is the step size, and Nk=T/kN_k = T/k for final time T>0T>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 22-smooth Banach spaces. The uniform strong error cannot be estimated in terms of the simpler pointwise strong error Ek:=(supj{0,,Nk}EU(tj)UjXp)1/p,E_k := \bigg(\sup_{j\in \{0,\ldots,N_k\}}\mathbb{E} \|U(t_j) - U^{j}\|_X^p\bigg)^{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.

Keywords

Cite

@article{arxiv.2307.07596,
  title  = {Temporal approximation of stochastic evolution equations with irregular nonlinearities},
  author = {Katharina Klioba and Mark Veraar},
  journal= {arXiv preprint arXiv:2307.07596},
  year   = {2024}
}

Comments

24 pages, this version: minor changes

R2 v1 2026-06-28T11:30:54.269Z