Nonstandard Finite Difference Variational Integrators for Multisymplectic PDEs

Cuicui Liao; Xiaohua Ding

doi:10.1155/2012/705179

Journal of Applied Mathematics (Jan 2012)

Nonstandard Finite Difference Variational Integrators for Multisymplectic PDEs

Cuicui Liao,
Xiaohua Ding

Affiliations

Cuicui Liao: Department of Mathematics, Harbin Institute of Technology, 2 Wenhua West Road, Shandong, Weihai 264209, China
Xiaohua Ding: Department of Mathematics, Harbin Institute of Technology, 2 Wenhua West Road, Shandong, Weihai 264209, China

DOI: https://doi.org/10.1155/2012/705179
Journal volume & issue: Vol. 2012

Abstract

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We use the idea of nonstandard finite difference methods to derive the discrete variational integrators for multisymplectic PDEs. We obtain a nonstandard finite difference variational integrator for linear wave equation with a triangle discretization and two nonstandard finite difference variational integrators for the nonlinear Klein-Gordon equation with a triangle discretization and a square discretization, respectively. These methods are naturally multisymplectic. Their discrete multisymplectic structures are presented by the multisymplectic form formulas. The convergence of the discretization schemes is discussed. The effectiveness and efficiency of the proposed methods are verified by the numerical experiments.

Published in Journal of Applied Mathematics

ISSN: 1110-757X (Print); 1687-0042 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://onlinelibrary.wiley.com/journal/4185

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