On the Coherent Structures of (2+1)-Dimensional Breaking Soliton Equation
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概要
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A variable separation approach is used to obtain exact solutions of high dimensional nonlinear physical models. Taking the breaking soliton equation as a simplify example, we show that a high dimensional nonlinear physical model may have quite rich localized coherent structures. For the breaking soliton equation, the richness of the localized structures caused by the entrance of some variables separated arbitrary functions. Some special types of the dromion solutions, lumps, ring solitons, curved solitons and breathers solution etc. are discussed by selecting the arbitrary functions appropriately.
- 社団法人日本物理学会の論文
- 2002-02-15
著者
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RUAN Hang-yu
Institute of Modern Physics, Ningbo University
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Ruan Hang-yu
Institute Of Modern Physics Ningbo University Ningbo:zhejiang Institute Of Modern Physics Zhejiang U
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Ruan Hang-yu
Institute Of Modern Physics Ningbo Normal College
関連論文
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- New Symmetries of the Jaulent-Miodek Hierarchy
- On the Coherent Structures of (2+1)-Dimensional Breaking Soliton Equation
- Localized Coherent Structures in (2+1)-Dimensional Generalized Nizhnik-Novikov-Veselov Equations : General Physics
- The Interactions of Solitons in (2 + 1)-Dimensional Modified Nizhnik-Novikov-Vesselov Equation (General)
- The Study of Exact Solutions to the Nonlinear Schrodinger Equations in Optical Fiber
- Dromion Interactions of (2+1)-Dimensional KdV-type Equations
- Dromion Interactions of (2+1)-Dimensional KdV-type Equations