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Differential equations in the spectral parameter, Darboux transformations and a hierarchy of master symmetries for KdV

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Abstract

We study a certain family of Schrödinger operators whose eigenfunctions ϕ(χ, λ) satisfy a differential equation in the spectral parameter λ of the formB(λ,∂ λ)ϕ=Θ(x)ϕ. We show that the flows of a hierarchy of master symmetries for KdV are tangent to the manifolds that compose the strata of this class ofbispectral potentials. This extends and complements a result of Duistermaat and Grünbaum concerning a similar property for the Adler and Moser potentials and the flows of the KdV hierarchy.

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Author notes

  1. Jorge P. Zubelli

    Present address: Department of Mathematics, University of California, 95064, Santa Cruz, CA, USA

  2. Franco Magri

    Present address: Departimento di Matematica, Università di Milano, I-20133, Milano, Italy

Authors and Affiliations

  1. Department of Mathematics, University of California, 94720, Berkeley, CA, USA

    Jorge P. Zubelli

  2. Mathematical Sciences Research Institute, University of California, 94720, Berkeley, CA, USA

    Franco Magri

Authors
  1. Jorge P. Zubelli
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  2. Franco Magri
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Communicated by A. Jaffe

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Zubelli, J.P., Magri, F. Differential equations in the spectral parameter, Darboux transformations and a hierarchy of master symmetries for KdV. Commun.Math. Phys. 141, 329–351 (1991). https://doi.org/10.1007/BF02101509

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  • DOI: https://doi.org/10.1007/BF02101509

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