Analytical and numerical study for the generalized q-deformed sinh-Gordon equation

IF 2.4 Q2 ENGINEERING, MECHANICAL
K. Ali
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引用次数: 2

Abstract

Abstract In this article, we study the generalized q q -deformed sinh-Gordon equation analytically using the new general form of Kudryashov’s approach and numerically using the finite difference method. We develop a general form of the Kudryashov method that contains more than one constant that is used to give more explanations for the solutions that are obtained. The numerical results are also presented using the finite difference approach. We also provide numerous figures to demonstrate the various solitons propagation patterns. The proposed equation has opened up new options for describing physical systems that have lost their symmetry. The equation under study has not been studied extensively, so we completed the lesson that started a short time ago on it.
广义q-变形sinh-Gordon方程的解析与数值研究
本文采用Kudryashov方法的新一般形式对广义q q变形sinh-Gordon方程进行了解析研究,并采用有限差分法对其进行了数值研究。我们开发了一种一般形式的Kudryashov方法,它包含多个常数,用于对得到的解给出更多的解释。用有限差分方法给出了数值结果。我们还提供了许多图形来演示各种孤子的传播模式。提出的方程为描述失去对称性的物理系统提供了新的选择。我们正在学习的方程还没有被广泛地研究过,所以我们完成了刚刚开始的关于它的课程。
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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来源期刊
CiteScore
6.20
自引率
3.60%
发文量
49
审稿时长
44 weeks
期刊介绍: The Journal of Nonlinear Engineering aims to be a platform for sharing original research results in theoretical, experimental, practical, and applied nonlinear phenomena within engineering. It serves as a forum to exchange ideas and applications of nonlinear problems across various engineering disciplines. Articles are considered for publication if they explore nonlinearities in engineering systems, offering realistic mathematical modeling, utilizing nonlinearity for new designs, stabilizing systems, understanding system behavior through nonlinearity, optimizing systems based on nonlinear interactions, and developing algorithms to harness and leverage nonlinear elements.
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