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Quasi-integrability of deformations of the KdV equation

ter Braak, F.; Ferreira, L.A.; Zakrzewski, W.J.

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Authors

F. ter Braak

L.A. Ferreira

W.J. Zakrzewski



Abstract

We investigate the quasi-integrability properties of various deformations of the Korteweg–de Vries (KdV) equation, depending on two parameters and , which include among them the regularized long-wave (RLW) and modified regularized long-wave (mRLW) equations. We show, using analytical and numerical methods, that the charges, constructed from a deformation of the zero curvature equation for the KdV equation, are asymptotically conserved for various values of the deformation parameters. By this we mean that, despite the fact that the charges do vary in time during the scattering of solitons, they return after the scattering to the same values they had before it. This property was tested numerically for the scattering of two and three solitons, and analytically for the scattering of two solitons in the mRLW theory (). In addition we show that for any values of and the Hirota method leads to analytical one-soliton solutions of our deformed equation but for such solutions have the dispersion relation which depends on the parameter . We also discuss some properties of soliton-radiation interactions seen in some of our simulations.

Citation

ter Braak, F., Ferreira, L., & Zakrzewski, W. (2019). Quasi-integrability of deformations of the KdV equation. Nuclear Physics B, 939, 49-94. https://doi.org/10.1016/j.nuclphysb.2018.12.004

Journal Article Type Article
Acceptance Date Dec 6, 2018
Online Publication Date Dec 10, 2018
Publication Date Feb 28, 2019
Deposit Date Jan 3, 2019
Publicly Available Date Jan 3, 2019
Journal Nuclear Physics B
Print ISSN 0550-3213
Electronic ISSN 1873-1562
Publisher Elsevier
Peer Reviewed Peer Reviewed
Volume 939
Pages 49-94
DOI https://doi.org/10.1016/j.nuclphysb.2018.12.004
Public URL https://durham-repository.worktribe.com/output/1306454

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