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 -smooth Banach spaces . The leading operator is assumed to generate a strongly continuous semigroup on , and the focus is on non-parabolic problems. The main result concerns convergence of the uniform strong error where , is the mild solution, is obtained from a time discretisation scheme, is the step size, and for final time . 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 -smooth Banach spaces. The uniform strong error cannot be estimated in terms of the simpler pointwise strong error 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