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Ergodic Numerical Approximation to Periodic Measures of Stochastic Differential Equations

Feng, Chunrong; Liu, Yu; Zhao, Huaizhong

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Authors

Yu Liu



Abstract

In this paper, we consider numerical approximation to periodic measure of a time periodic stochastic differential equations (SDEs) under weakly dissipative condition. For this we first study the existence of the periodic measure ρt and the large time behaviour of U(t+s, s, x) := Eφ(Xs,xt) −R φdρt, where X s,xt is the solution of the SDEs and φ is a test function being smooth and of polynomial growth at infinity. We prove U and all its spatial derivatives decay to 0 with exponential rate on time t in the sense of average on initial time s. We also prove the existence and the geometric ergodicity of the periodic measure of the discretized semi-flow from the Euler-Maruyama scheme and moment estimate of any order when the time step is sufficiently small (uniform for all orders). We thereafter obtain that the weak error for the numerical scheme of infinite horizon is of the order 1 in terms of the time step. We prove that the choice of step size can be uniform for all test functions φ. Subsequently we are able to estimate the average periodic measure with ergodic numerical schemes.

Citation

Feng, C., Liu, Y., & Zhao, H. (2021). Ergodic Numerical Approximation to Periodic Measures of Stochastic Differential Equations. Journal of Computational and Applied Mathematics, 398, Article 113701. https://doi.org/10.1016/j.cam.2021.113701

Journal Article Type Article
Acceptance Date Jun 18, 2021
Online Publication Date Jun 24, 2021
Publication Date Dec 15, 2021
Deposit Date Jun 23, 2021
Publicly Available Date Mar 29, 2024
Journal Journal of Computational and Applied Mathematics
Print ISSN 0377-0427
Publisher Elsevier
Peer Reviewed Peer Reviewed
Volume 398
Article Number 113701
DOI https://doi.org/10.1016/j.cam.2021.113701

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