On the (2+1)-Dimensional Integrable Inhomogeneous Heisenberg Ferromagnet Equation(General)
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概要
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By using the prolongation structure theory proposed by Morris, we give a (2+1)-dimensional integrable inhomogeneous Heisenberg Ferromagnet equation, namely, the inhomogeneous Myrzakulov I equation. Through the motion of space curves endowed with an additional spatial variable, its geometrical equivalent counterpart is also presented.
- 社団法人日本物理学会の論文
- 2006-10-15
著者
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Zhang Zhen-huan
Department Of Mathematics Capital Normal University
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Zhao Wei-zhong
Department Of Mathematics Capital Normal University
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WU Ke
Department of Mathematics, Capital Normal University
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DENG Ming
Department of Mathematics, Capital Normal University
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Deng Ming
Department Of Mathematics Capital Normal University
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Wu Ke
Department Of Mathematics Capital Normal University:klmm Amss Chinese Academia Of Sciences
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Wu Ke
Department Of Mathematics Capital Normal University
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Zhao Wei‐zhong
Department Of Mathematics Capital Normal University
関連論文
- On the Geometric Equivalence of the Discrete Integrable Modified Heisenberg Ferromagnet Model(General)
- On the (2+1)-Dimensional Integrable Inhomogeneous Heisenberg Ferromagnet Equation(General)