Optical soliton solutions, bifurcation, and stability analysis of the Chen-Lee-Liu model

Rayhanul Islam, S M; Khan, Kamruzzaman; Akbar, M Ali

doi:10.1016/j.rinp.2023.106620

Author(s)

Rayhanul Islam, S M

Khan, Kamruzzaman

Akbar, M Ali

Publication Date

2023-08

Abstract

<p>The Chen-Lee -Liu model has many applications in assorted fields, particularly in the study of nonlinear dynamics, chaos theory, circuit design, signal processing, secure communications, encryption and decryption of chaotic signals, as well as cryptography. The modified extended auxiliary equation mapping method has been applied to the Chen-Lee-Liu model in this article and explores new wave profiles, such as singular periodic solutions, periodic solutions, and kink-type soliton solutions. The complex wave conversion is considered to make a simple differential equation. Three- and two-dimensional images are plotted using Mathematica and MATLAB, and their dispersion and nonlinearity effects are discussed. We also discuss the bifurcation analysis of the studied model. The stability of the equilibrium points is studied, and the phase portrait of the system is presented graphically. The obtained wave profiles might play an important role in telecommunication systems, fiber optics, and nonlinear optics.</p>

Citation

Results in Physics, v.51, p. 1-9

ISSN

2211-3797

Link

https://hdl.handle.net/1959.11/56238

Language

en

Publisher

Elsevier BV

Rights

Attribution-NonCommercial-NoDerivatives 4.0 International

Title

Optical soliton solutions, bifurcation, and stability analysis of the Chen-Lee-Liu model

Type of document

Journal Article

Entity Type

Publication

Author(s)	Rayhanul Islam, S M Khan, Kamruzzaman Akbar, M Ali
Publication Date	2023-08
Abstract	<p>The Chen-Lee -Liu model has many applications in assorted fields, particularly in the study of nonlinear dynamics, chaos theory, circuit design, signal processing, secure communications, encryption and decryption of chaotic signals, as well as cryptography. The modified extended auxiliary equation mapping method has been applied to the Chen-Lee-Liu model in this article and explores new wave profiles, such as singular periodic solutions, periodic solutions, and kink-type soliton solutions. The complex wave conversion is considered to make a simple differential equation. Three- and two-dimensional images are plotted using Mathematica and MATLAB, and their dispersion and nonlinearity effects are discussed. We also discuss the bifurcation analysis of the studied model. The stability of the equilibrium points is studied, and the phase portrait of the system is presented graphically. The obtained wave profiles might play an important role in telecommunication systems, fiber optics, and nonlinear optics.</p>
Citation	Results in Physics, v.51, p. 1-9
ISSN	2211-3797
Link	https://hdl.handle.net/1959.11/56238
Language	en
Publisher	Elsevier BV
Rights	Attribution-NonCommercial-NoDerivatives 4.0 International
Title	Optical soliton solutions, bifurcation, and stability analysis of the Chen-Lee-Liu model
Type of document	Journal Article
Entity Type	Publication

Optical soliton solutions, bifurcation, and stability analysis of the Chen-Lee-Liu model

Files: