Stability and Numerical Dispersion of High Order Symplectic Schemes

CHINESE JOURNAL OF COMPUTATIONAL PHYSICS ›› 2010, Vol. 27 ›› Issue (1): 82-88.

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Stability and Numerical Dispersion of High Order Symplectic Schemes

HUANG Zhixiang¹, SHA Wei², WU Xianliang^1,3, CHEN Mingsheng³, KUANG Xiaojing¹

1. Key Lab of Intelligent Computing & Signal Processing, Anhui University, Ministry of Education, Hefei 230039, China;
2. Electrical and Electronic Engineering Department, Hong Kong University, Hongkong, China;
3. Physical and Electronic Engineering Department, Hefei Teachers College, Hefei 230601, China

Received:2008-09-04 Revised:2009-02-18 Online:2010-01-25 Published:2010-01-25

Abstract

Abstract: Euler-Hamilton equations are provided using Hamiltonian function of Maxwell's equations.High order symplectic schemes of three-dimensional time-domain Maxwell's equations are constructed with symplectic integrator technique combined with high order staggered difference.The method is used to analyzing stability and numerical dispersion of high order time-domain methods and symplectic schemes with matrix analysis and tensor product.It confirms accuracy of the scheme and super ability compared with other time-domain methods.

Key words: Hamiltonian function, symplectic integrator technique, stability and numerical dispersion, high order symplectic schemes

CLC Number:

HUANG Zhixiang, SHA Wei, WU Xianliang, CHEN Mingsheng, KUANG Xiaojing. Stability and Numerical Dispersion of High Order Symplectic Schemes[J]. CHINESE JOURNAL OF COMPUTATIONAL PHYSICS, 2010, 27(1): 82-88.

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Stability and Numerical Dispersion of High Order Symplectic Schemes

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