Exact Optical Solitons for Generalized Kudryashov’s Equation by Lie Symmetry Method

IF 0.7 Q2 MATHEMATICS
R. Ramaswamy, E. S. El-Shazly, M. S. Abdel Latif, A. Elsonbaty, A. H. Abdel Kader
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Abstract

In this article, we use Lie point symmetry analysis to extract some new optical soliton solutions for the generalized Kudryashov’s equation (GKE) with an arbitrary power nonlinearity. Using a traveling wave transformation, the GKE is transformed into a nonlinear second order ordinary differential equation (ODE). Using Lie point symmetry analysis, the nonlinear second-order ODE is reduced to a first-order ODE. This first-order ODE is solved in two cases to retrieve some new bright, dark, and kink soliton solutions of the GKE. These soliton solutions for the GKE are obtained here for the first time.
广义Kudryashov方程的李对称精确光学孤子
本文利用李点对称分析方法,对具有任意幂次非线性的广义Kudryashov方程(GKE)提取了一些新的光学孤子解。利用行波变换,将GKE变换成非线性二阶常微分方程(ODE)。利用李点对称分析,将非线性二阶ODE简化为一阶ODE。求解了两种情况下的一阶ODE,得到了GKE的亮孤子解、暗孤子解和扭结孤子解。本文首次得到了GKE的孤子解。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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