Convergence Analysis of Parareal Algorithm Based on Milstein Scheme for Stochastic Differential Equations

Authors

Liying Zhang School of Mathematical Science, China University of Mining and Technology, Beijing, China
Jing Wang Department of Chemistry, Liaoning University, Shenyang 110036, P. R. China
Weien Zhou National Innovation Institute of Defense Technology, Chinese Academy of Military Science, Beijing 100101, China
Landong Liu School of Mathematical Science, China University of Mining and Technology, Beijing 100083, China
Li Zhang Department of Foundation Courses, Beijing Union University, Beijing 100101, China

DOI:

https://doi.org/10.4208/jcm.1901-m2018-0085

Keywords:

Stochastic differential equations, Parareal algorithm, Convergence, Stochastic Taylor expansion, Milstein scheme.

Abstract

In this paper, we propose a parareal algorithm for stochastic differential equations (SDEs), which proceeds as a two-level temporal parallelizable integrator with the Milstein scheme as the coarse propagator and the exact solution as the fine propagator. The convergence order of the proposed algorithm is analyzed under some regular assumptions. Finally, numerical experiments are dedicated to illustrating the convergence and the convergence order with respect to the iteration number $k$, which show the efficiency of the proposed method.

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Published

2020-03-24

Issue

Vol. 38 No. 3 (2020)

Section

Articles