A conservative Galerkin finite element method for the Klein- Gordon equation in high dimensions
Authors
Huawei Zhao and Yue Cheng
Abstract
School of Mathematics and Statistics, Nanjing University of Information Science & Technology, \u00a0
Nanjing, 210044, China
(Received January 06 2019, accepted May 20 2019)
In \u00a0this \u00a0article, \u00a0we \u00a0design \u00a0and \u00a0analyze \u00a0a \u00a0Galerkin \u00a0finite \u00a0element \u00a0method \u00a0(FEM) \u00a0to \u00a0solve \u00a0the
nonlinear Klein-Gordon equation in \ud835\udc51(\ud835\udc51 = 1,2,3) dimensions. The scheme is proved to preserve well the total
energy \u00a0in \u00a0the \u00a0discrete \u00a0sense, \u00a0which \u00a0is \u00a0consistent \u00a0with \u00a0the \u00a0conservative \u00a0property \u00a0possessed \u00a0by \u00a0the \u00a0original \u00a0
problem. Numerical results are reported to show the high accuracy of the numerical methods and confirm the
energy conservation. \u00a0
