Some New Nonlinear Defferential-Difference Integrable Hierarchies
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概要
- 論文の詳細を見る
Souaue new nonlinear differential-difl'erence integrable hierarchies associated with a properlydiscrete spectral problern are obtained. The special cases of tlte proposed differential-differenceintegrable hierarchies are discussed. The Ablowitz-Ladik 'discretization of the NLS equation,the discrete modified KdV eqtration, the modified Toda lattice, the relativistic Tod?t lattice,and sonae other lattice soliton equations obtained by Suris are the special exaraaples of noveldifferential-difference integrable hierarcies.
- 社団法人日本物理学会の論文
- 1998-10-15
著者
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Zhu Zuonong
Ccast (world Laboratory):department Of Mathematics Hong Kong Baptist University
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Zhu Zuonong
Ccast (world Lab.):department Of Mathematics Hong Kong Baptist University
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Huang Hongci
Department Of Mathematics Hong Kong Baptist University
関連論文
- The Gauge Equivalent Structure of the Landau-Lifshitz Equation and Its Applications(General)
- Two Coupled Integrable Hierarchies Possessing Hereditary Symmetry
- New Lax Representation and Integrable Discretization of the Relativistic Volterra Lattice
- A New Lax Integrable Hierarchy and Its Hamiltonian Form
- Some New Nonlinear Defferential-Difference Integrable Hierarchies