High-Order Rogue Waves and Their Dynamics of the Fokas–Lenells Equation Revisited: a Variable Separation Technique
Zihao Wang, Linyun He, Zhenyun Qin, Roger Grimshaw, Gui Mu
Nonlinear Dynamics, 2019
Abstract
The Fokas–Lenells (FL) equation is an integrable higher-order extension of nonlinear Schrödinger equation. One approach to generating its breather solutions is based on Darboux transformation (DT) and iterations. However, the DT of FL equation contains negative powers of the spectral parameter, which can lead to very complicated expressions when $N$ is large. In this paper, we avoid the negative powers by adopting a variable separation and Taylor expansion technique to solve the Lax pair of FL system. Furthermore, stability of the proposed technique is demonstrated in detail.
Citation
@article{wang2019high,
title={High-order rogue waves and their dynamics of the Fokas--Lenells equation revisited: a variable separation technique},
author={Wang, Zihao and He, Linyun and Qin, Zhenyun and Grimshaw, Roger and Mu, Gui},
journal={Nonlinear Dynamics},
volume={98},
number={3},
pages={2067--2077},
year={2019},
publisher={Springer}
}