Multi-Component Generalizations of Four Integrable Differential-Difference Equations : Soliton Solutions and Bilinear Backlund Transformations(General)
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概要
- 論文の詳細を見る
Bilinear approach is applied to derive integrable multi-component generalizations of the so-called 1 + 1 dimensional special Toda lattice, the Volterra lattice, a simple differential-difference equation found by Adler, Moser, Weiss, Veselov and Shabat and another integrable lattice reduced from the discrete BKP equation Their soliton solutions expressed by pfaffians and the corresponding bilinear Backlund transformations are obtained.
- 社団法人日本物理学会の論文
- 2004-12-15
著者
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Zhao Jun-xiao
Department Of Mathematics Graduate University Of Chinese Academy Of Sciences
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Zhao J‐x
Inst. Computational Mathematics And Scientific Engineering Computing Academia Sinica Beijing Chn
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Hu X‐b
Inst. Computational Mathematics And Scientific Engineering Computing Academia Sinica Beijing Chn
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Hu Xing-biao
Institute Of Computational Mathematics And Scientific Engineering Computing Academy Of Mathematics A
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Hu Xing-biao
State Key Laboratory Of Scientific And Engineering Computing Institute Of Computational Mathematics
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Hu Xing-biao
Institute Of Computational Mathematics Amss Chinese Academy Of Sciences
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ZHAO Jun-Xiao
Institute of Computational Mathematics and Scientific Engineering Computing, Academy of Mathematics
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HIROTA Ryogo
Professor Emeritus, Waseda University
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Zhao Jun-xiao
Institute Of Computational Mathematics And Scientific Engineering Computing Academy Of Mathematics A
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Hirota Ryogo
Professor Emeritus Waseda University
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