Exponential integrators for the stochastic Manakov equation
Numerical Analysis
2020-05-12 v1 Numerical Analysis
Abstract
This article presents and analyses an exponential integrator for the stochastic Manakov equation, a system arising in the study of pulse propagation in randomly birefringent optical fibers. We first prove that the strong order of the numerical approximation is if the nonlinear term in the system is globally Lipschitz-continuous. Then, we use this fact to prove that the exponential integrator has convergence order in probability and almost sure order , in the case of the cubic nonlinear coupling which is relevant in optical fibers. Finally, we present several numerical experiments in order to support our theoretical findings and to illustrate the efficiency of the exponential integrator as well as a modified version of it.
Cite
@article{arxiv.2005.04978,
title = {Exponential integrators for the stochastic Manakov equation},
author = {André Berg and David Cohen and Guillaume Dujardin},
journal= {arXiv preprint arXiv:2005.04978},
year = {2020}
}