Two-parameter determinant representation of seventh order rogue wave solutions of the NLS equation

Pierre Gaillard

doi:10.1186/2251-7235-7-45

10.1186/2251-7235-7-45

Two-parameter determinant representation of seventh order rogue wave solutions of the NLS equation

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Pierre Gaillard¹,

Universit Ìe de Bourgogne Franche Comt Ìe, Institut de math Ìematiques de Bourgogne, Dijon Cedex, France

Published in Issue 2023-11-17

How to Cite

Gaillard P. Two-parameter determinant representation of seventh order rogue wave solutions of the NLS equation. J Theor Appl phys. 2023 Nov. 17;7(1). Available from: https://oiccpress.com/jtap/article/view/2139

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Abstract

AbstractWe present a new representation of solutions of focusing nonlinear SchrÃ¶dinger equation (NLS) equation as a quotient of two determinants. We construct families of quasi-rational solutions of the NLS equation depending on two parameters, a and b. We construct, for the first time, analytical expressions of Peregrine breather of order 7 and multi-rogue waves by deformation of parameters. These expressions make possible to understand the behavior of the solutions. In the case of the Peregrine breather of order 7, it is shown for great values of parameters a or b the appearance of the Peregrine breather of order 5.PACS35Q55; 37K10

Keywords

Akhmedievâs solutions,
NLS equation,
Peregrine breather,
Rogue waves,
Wronskians determinants

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Two-parameter determinant representation of seventh order rogue wave solutions of the NLS equation

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Abstract

Keywords