Moving breathers and breather-to-soliton conversions for the Hirota equation

Date

2015

Authors

Chowdury, Atiqur
Ankiewicz, Adrian
Akhmediev, Nail

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Volume Title

Publisher

Royal Society of London

Abstract

We find that the Hirota equation admits breather-tosoliton conversion at special values of the solution eigenvalues. This occurs for the first-order, as well as higher orders, of breather solutions. An analytic expression for the condition of the transformation is given and several examples of transformations are presented. The values of these special eigenvalues depend on two free parameters that are present in the Hirota equation. We also find that higher order breathers generally have complicated quasi-periodic oscillations along the direction of propagation. Various breather solutions are considered, including the particular case of second-order breathers of the nonlinear Schrödinger equation.

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Source

Proceedings of the Royal Society of London Series A: Mathematical, Physical and Engineering Sciences

Type

Journal article

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2037-12-31