An inverse spectral problem related to the Geng-Xue two-component peakon equation
著者
書誌事項
An inverse spectral problem related to the Geng-Xue two-component peakon equation
(Memoirs of the American Mathematical Society, no. 1155)
American Mathematical Society, 2016
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注記
"volume 244, number 1155 (fourth of 4 numbers), November 2016"
Includes bibliographical references
内容説明・目次
内容説明
The authors solve a spectral and an inverse spectral problem arising in the computation of peakon solutions to the two-component PDE derived by Geng and Xue as a generalization of the Novikov and Degasperis-Procesi equations. Like the spectral problems for those equations, this one is of a ``discrete cubic string'' type-a nonselfadjoint generalization of a classical inhomogeneous string--but presents some interesting novel features: there are two Lax pairs, both of which contribute to the correct complete spectral data, and the solution to the inverse problem can be expressed using quantities related to Cauchy biorthogonal polynomials with two different spectral measures. The latter extends the range of previous applications of Cauchy biorthogonal polynomials to peakons, which featured either two identical, or two closely related, measures. The method used to solve the spectral problem hinges on the hidden presence of oscillatory kernels of Gantmacher-Krein type, implying that the spectrum of the boundary value problem is positive and simple. The inverse spectral problem is solved by a method which generalizes, to a nonselfadjoint case, M. G. Krein's solution of the inverse problem for the Stieltjes string.
目次
Introduction
Forward spectral problem
The discrete case
The inverse spectral problem
Concluding remarks
Appendix A. Cauchy biorthogonal polynomials
Appendix B. The forward spectral problem on the real line
Appendix C. Guide to notation
Bibliography
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