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Volumn 70, Issue 3, 2001, Pages 653-661

Multisymplectic Geometry and Multisymplectic Scheme for the Nonlinear Klein Gordon Equation

Author keywords

Multisympletic geometry; Multisympletic scheme; Nonlinear Klein Gordon equation; Soliton

Indexed keywords


EID: 0035609802     PISSN: 00319015     EISSN: None     Source Type: Journal    
DOI: 10.1143/JPSJ.70.653     Document Type: Article
Times cited : (15)

References (12)
  • 2
    • 0004034109 scopus 로고    scopus 로고
    • K. Feng and M. Z. Qin: The symplectic methods for computation of Hamiltonian systems, Proc. Conf. on Numerical Methods for PDEs, ed. Y. L. Zhu and B.-Y. Guo (Springer, Berlin, 1987) pp. 1-37, Lecture notes in Math, 1297.
    • Lecture Notes in Math , pp. 1297
  • 8
    • 0034687898 scopus 로고    scopus 로고
    • S. Reich: JCP 157 (2000) 473.
    • (2000) JCP , vol.157 , pp. 473
    • Reich, S.1
  • 11
    • 84965060858 scopus 로고
    • Finite difference calculus invariant structure of a class algorithms for the nonlinear Klein Gordon equation
    • December
    • S. Li and L. Vu-Quoc: Finite difference calculus invariant structure of a class algorithms for the nonlinear Klein Gordon equation. SIAM J. Numer. Anal., Vol. 32, No. 6, pp. 1839-1875, December 1995.
    • (1995) SIAM J. Numer. Anal. , vol.32 , Issue.6 , pp. 1839-1875
    • Li, S.1    Vu-Quoc, L.2
  • 12
    • 0002079274 scopus 로고
    • Analysis of four numerical schemes for a Nonlinear Klein Gordon equation
    • S. Jimenez and L. Vazquez: Analysis of four numerical schemes for a Nonlinear Klein Gordon equation. Applied Mathematics and computations. 35:61-94 (1990).
    • (1990) Applied Mathematics and Computations , vol.35 , pp. 61-94
    • Jimenez, S.1    Vazquez, L.2


* 이 정보는 Elsevier사의 SCOPUS DB에서 KISTI가 분석하여 추출한 것입니다.