Solving the constrained modified KP hierarchy by gauge transformations |
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Authors: | Huizhan Chen Lumin Geng Na Li |
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Affiliation: | School of Mathematics, China University of Mining and Technology, Xuzhou, Jiangsu 221116, P. R. China |
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Abstract: | In this paper, we mainly investigate two kinds of gauge transformations for the constrained modified KP hierarchy in Kupershmidt-Kiso version. The corresponding gauge transformations are required to keep not only the Lax equation but also the Lax operator. For this, by selecting the special generating eigenfunction and adjoint eigenfunction, the elementary gauge transformation operators of modified KP hierarchy TD(Φ) = (Φ?1)?x1? Φ?1 and TI (Ψ) = Ψ?1? ?1Ψx, become the ones in the constrained case. Finally, the corresponding successive applications of TD and TI on the eigenfunction Φ and the adjoint eigenfunction Ψ are discussed. |
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Keywords: | The constrained mKP hierarchy gauge transformations successive applications |
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