Analysis of the dynamical behaviors for the generalized Bogoyavlvensky–Konopelchenko equation and its analytical solutions occurring in mathematical physics

IF 6 2区 工程技术 Q1 ENGINEERING, MULTIDISCIPLINARY
Karim K. Ahmed , Hisham H. Hussein , Hamdy M. Ahmed , Wafaa B. Rabie , Wassim Alexan
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Abstract

In the domains of fluid mechanics, hydrodynamics, and marine engineering, Bogoyavlensky–Konopelchenko equations are of great interest to mathematicians and physicists as a means of illuminating the diverse dynamics of non-linear wave events. In this study, to pique readers' interest, we investigate the soliton solutions of a dynamical model, which is the mathematical physics equivalent of the (2+1)-dimensional generalized Bogoyavlensky–Konopelchenko equation (GBKE). Utilizing the improved modified extended tanh-function scheme (IMETFS), we generate several innovative solutions. Utilizing the previously described approach, we find new types of solutions that have never been found before to demonstrate their originality for the problem at hand, such as dark, singular soliton, exponential, hyperbolic, singular periodic, Jacobi elliptic function (JEF), and rational solutions. The results show that the computational procedures are clear, informed, and effective. By integrating them with representational calculations, they may be used for more intricate phenomena. The efficacy of our method indicates that it may be utilized to tackle other non-linear challenges in many domains, particularly in soliton theory, since the examined model appears in many applications. Utilizing the computer algebra system, Wolfram Mathematica®, the propagation of the well-furnished results is visualized through contour plots, 2D and 3D visualizations for different values of the required free parameters. All of the research's conclusions are necessary to comprehend the behavior and physical significance of the examined equation, highlighting how crucial it is to examine various non-linear wave phenomena in the field of engineering mathematics and physical sciences.
分析数学物理中出现的广义博戈亚弗尔文斯基-科诺佩尔琴科方程的动力学行为及其解析解
在流体力学、流体动力学和海洋工程领域,博戈亚夫连斯基-科诺佩琴科方程是数学家和物理学家非常感兴趣的一种揭示非线性波浪事件各种动态的方法。在本研究中,为了激发读者的兴趣,我们研究了一个动力学模型的孤子解,该模型相当于 (2+1)-dimensional 广义 Bogoyavlensky-Konopelchenko 方程 (GBKE) 的数学物理模型。利用改进的扩展 tanh 函数方案(IMETFS),我们生成了几种创新的解决方案。利用之前描述的方法,我们找到了以前从未发现过的新型解,以证明它们对当前问题的独创性,如暗解、奇异孤子解、指数解、双曲线解、奇异周期解、雅可比椭圆函数(JEF)解和有理解。结果表明,计算程序清晰、翔实、有效。通过将它们与表征计算相结合,可以用于处理更复杂的现象。我们方法的有效性表明,它可用于解决许多领域的其他非线性难题,尤其是孤子理论,因为所研究的模型出现在许多应用中。利用计算机代数系统 Wolfram Mathematica®,通过等值线图、二维和三维可视化,对所需自由参数的不同值进行了可视化处理,从而对所提供的结果进行了传播。所有研究结论都是理解所研究方程的行为和物理意义所必需的,突出了在工程数学和物理科学领域研究各种非线性波现象的重要性。
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来源期刊
Ain Shams Engineering Journal
Ain Shams Engineering Journal Engineering-General Engineering
CiteScore
10.80
自引率
13.30%
发文量
441
审稿时长
49 weeks
期刊介绍: in Shams Engineering Journal is an international journal devoted to publication of peer reviewed original high-quality research papers and review papers in both traditional topics and those of emerging science and technology. Areas of both theoretical and fundamental interest as well as those concerning industrial applications, emerging instrumental techniques and those which have some practical application to an aspect of human endeavor, such as the preservation of the environment, health, waste disposal are welcome. The overall focus is on original and rigorous scientific research results which have generic significance. Ain Shams Engineering Journal focuses upon aspects of mechanical engineering, electrical engineering, civil engineering, chemical engineering, petroleum engineering, environmental engineering, architectural and urban planning engineering. Papers in which knowledge from other disciplines is integrated with engineering are especially welcome like nanotechnology, material sciences, and computational methods as well as applied basic sciences: engineering mathematics, physics and chemistry.
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