Dynamical Discussion and Diverse Soliton Solutions via Complete Discrimination System Approach Along with Bifurcation Analysis for the Third Order NLSE

IF 0.5 Q3 MATHEMATICS Malaysian Journal of Mathematical Sciences Pub Date : 2023-09-13 DOI:10.47836/mjms.17.3.09
S. T. R. Rizvi, A. R. Seadawy, B. Mustafa
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Abstract

The purpose of this study is to introduce the wave structures and dynamical features of the third-order nonlinear Schr\"{o}dinger equations (TONLSE). We take the original equation and, using the traveling wave transformation, convert it into the appropriate traveling wave system, from which we create a conserved quantity known as the Hamiltonian. The Jacobian elliptic function solution (JEF), the hyperbolic function solution, and the trigonometric function solution are just a few of the optical soliton solutions to the equation that may be found using the complete discrimination system (CDS) of polynomial method (CDSPM) and also transfer the JEF into solitary wave (SW) soltions. It also includes certain dynamic results, such as bifurcation points and critical conditions for solutions, that might be utilized to explore the dynamic features of the equation employing the CDSPM. This method could also be used for qualitative analysis. The qualitative analysis is used to illustrate the equilibrium points and phase potraits of the equation. Phase portraits are visual representations used in dynamical systems to illustrate a system's behaviour through time. They can provide crucial information about a system's stability, periodic behaviour, and the presence of attractors or repellents.
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三阶NLSE的完全判别系统的动力学讨论和多种孤子解及分岔分析
本研究的目的是介绍三阶非线性Schr\ {o}dinger方程(TONLSE)的波动结构和动力学特征。我们用原始方程,用行波变换,把它转换成合适的行波系统,从中我们得到一个守恒量,叫做哈密顿量。Jacobian椭圆函数解(JEF)、双曲函数解和三角函数解只是利用多项式方法(CDSPM)的完全判别系统(CDS)可以找到的方程的光学孤子解中的几个,并将JEF转化为孤波解(SW)。它还包括某些动态结果,如分岔点和解的临界条件,这些结果可以用来探索采用CDSPM的方程的动态特征。该方法也可用于定性分析。用定性分析的方法说明了方程的平衡点和相特征。相图是动态系统中用于说明系统随时间变化的行为的视觉表示。它们可以提供关于系统稳定性、周期性行为以及吸引或排斥存在的关键信息。
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CiteScore
1.10
自引率
20.00%
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0
期刊介绍: The Research Bulletin of Institute for Mathematical Research (MathDigest) publishes light expository articles on mathematical sciences and research abstracts. It is published twice yearly by the Institute for Mathematical Research, Universiti Putra Malaysia. MathDigest is targeted at mathematically informed general readers on research of interest to the Institute. Articles are sought by invitation to the members, visitors and friends of the Institute. MathDigest also includes abstracts of thesis by postgraduate students of the Institute.
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