Casorati Determinant Solution for the Relativistic Toda Lattice Equation

3-8-1 Komaba; 7-3-1 Hongo; Bunkyu-ku; Faculty of Engineering; Japan); Japan) Junkichi Satsuma (Department of Mathematical Sciences; Japan) Kenji Kajiwara (Department of Applied Physics; Kyoto 606; Kyoto University; Meguro-ku

arxiv: solv-int/9304002 · v1 · submitted 1993-04-22 · solv-int · nlin.SI

Casorati Determinant Solution for the Relativistic Toda Lattice Equation

Yasuhiro Ohta (Research Institute for Mathematical Sciences , Kyoto University , Kyoto 606 , Japan) Kenji Kajiwara (Department of Applied Physics , Faculty of Engineering , University of Tokyo , 7-3-1 Hongo , Bunkyu-ku

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Tokyo 113 Japan) Junkichi Satsuma (Department of Mathematical Sciences 3-8-1 Komaba Meguro-ku Tokyo 153 Japan)

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classification solv-int nlin.SI

keywords todalatticecasoratideterminantequationformrelativisticsolution

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The relativistic Toda lattice equation is decomposed into three Toda systems, the Toda lattice itself, B\"acklund transformation of Toda lattice and discrete time Toda lattice. It is shown that the solutions of the equation are given in terms of the Casorati determinant. By using the Casoratian technique, the bilinear equations of Toda systems are reduced to the Laplace expansion form for determinants. The $N$-soliton solution is explicitly constructed in the form of the Casorati determinant.

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Casorati Determinant Solution for the Relativistic Toda Lattice Equation

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