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双非线性化Toda特征值问题的Lie-Poisson结构(英文) 被引量:1

Lie-Poisson Structure for the Binary Nonlinearized Toda Spectral Problem
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摘要 利用H am ilton对称群的作用不变量,将R4N上具有标准辛结构的双非线性化T oda特征值问题约化为R4N/(R>0)N上L ie-Po iss on结构下的3×3非线性化特征值问题;并进一步讨论了该3×3非线性化特征值问题与R2N上标准辛结构下的2×2非线性化特征值问题之间的关系. Hamiltonian symmetry group(R〉0)^N generated through a family of conserved integrals is proposed.The method of invariants is used to reduce the binary nonlinearized Toda spectral problem on R^4N into a 3×3 nonlinearized spectral problem with a Lie-Poisson structure on R^4N/(R〉0)^N.Furthermore,it is shown that the 3×3 one restricted on the common level set of cones is a usual 2×2 mono-nonlinearized spectral problem.
作者 杜殿楼 郝艳红
机构地区 郑州大学数学系
出处 《郑州大学学报(理学版)》 CAS 2005年第3期1-6,共6页 Journal of Zhengzhou University:Natural Science Edition
基金 国家自然科学基金资助项目,编号10471132 河南省教育厅自然科学基金资助项目,编号2004110006.
关键词 约化 LIE-POISSON结构 辛映射 Poisson映射 reduction Lie-Poisson structure symplectic map Poisson map
分类号 O175.7 [理学—基础数学]
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参考文献6

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同被引文献14

  • 1杜殿楼.Lie-Poisson框架下的Dirac-Bargmann系统的可积性[J].河南科学,2005,23(4):472-475. 被引量:1
  • 2曹策问.AKNS族的Lax方程组的非线性化[J].中国科学(A辑),1989,20(7):701-707. 被引量:35
  • 3Cao Cewen,Geng Xianguo. Classical integrable systems generated through nonlinearization of eigenvalue problems[C].ProcConf on Nonlinear Physics(Shanghai 1989),Research Reports in Physics. Berlin:Springer,1990:66-78.
  • 4Cao Cewen. A Classical integrable system and the involutive representation of solutions of the KdV equation[J]. Acta Math Sinica,New Series 1991,7(3):216-223.
  • 5Geng Xianguo. Finite-dimensional discrete systems and integrable systems through nonlinearization of the discrete eigenvalueproblem[J]. Journal of Mathematical Physics,1993,34(2):805-817.
  • 6Cao Cewen,Wu Yongtang,Geng Xianguo. Relation between the Kadometsev-Petviashvili equation and the confocal involutivesystem[J]. J Math Phys,1998,40:3948-3970.
  • 7Geng Xianguo,Cao Cewen. Quasi-periodic solutions of the 2+1 dimensional modified Korteweg–de Vries equation[J]. PhysicsLetters A,1999,261(5-6):289-296.
  • 8Wu Yongtang,Zhang Jinshun. Quasi-periodic solution of a new(2+1)-dimensional coupled soliton equation[J]. Journal ofPhysics A Mathematical & General,2001,34(1):193-210.
  • 9Xue Shan,Du Dianlou. A new hierarchy of(1+1)-dimensional soliton equations and its quasi-periodic solutions[J]. Chaos,Solitons & Fractals,2008,35(4):692-704.
  • 10Du Dianlou,Cao Cewen,Wu Yongtang. The nonlinearized eigenvalue problem of the Toda hierarchy in the Lie-Poissonframework[J]. Phys A,2000,285:332-350.

引证文献1

郑州大学学报(理学版)
2005年 第3期

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