U.H.M. Zaman , Mohammad Asif Arefin , M. Ali Akbar , M. Hafiz Uddin
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引用次数: 0
Abstract
Nonlinear fractional partial differential equations can explain a vast scope of engineering and science, like atomic physics, wireless transmission, nonlinear optics, acoustics, economics, materials science, control theory, plasma physics, quantum plasma in mechanics, biological systems of nonlinear case and so on. In this study, the new generalized -expansion technique have been studied for examine the nonlinear fractional equations and built exact analytical traveling as well as solitary wave solutions namely space–time one-dimensional fractional wave equation used to simulate wave transmission in a nonlinear medium with blending and space–time fractional regularized long wave equation enables bore expansion and wave generating in nonlinear model of solitary waves, ion acoustic plasma waves, shallow waves in water, and nonlinear dispersive waves with the help of conformable derivatives. The creatable equations are transformed into ordinary differential equations by fractional complex transformation. Some dynamical wave shapes of multiple solitons, single soliton, periodic anti-kink, anti-kink, flat-kink type solitary wave models have been created, and 3D, and contour have been built to represent these solutions. The results are expressed using hyperbolic, rational functions, and trigonometric and Maple or Mathematica utilized to graphically represent the obtained solutions. It is essential to point out that all resultant solutions are directly compared to the original solutions to ensure their exactness. The new generalized -expansion method is an operative, compatible, and fruitful approach for analyzing nonlinear fractional traveling waves.
非线性分式偏微分方程可以解释广泛的工程和科学领域,如原子物理、无线传输、非线性光学、声学、经济学、材料科学、控制理论、等离子体物理、力学中的量子等离子体、非线性情况下的生物系统等。在这项研究中,研究了新的广义(G′/G)-展开技术,用于研究非线性分式方程,并建立了精确的分析行程以及孤波解决方案,即时空一维分式波方程,用于模拟非线性介质中的混合波传输,以及时空分式正则化长波方程,借助符合导数,在孤波、离子声学等离子体波、水中浅波和非线性色散波等非线性模型中实现孔径扩展和波生成。通过分数复变,可创建方程被转化为常微分方程。创建了一些多孤子、单孤子、周期性反扭结、反扭结、平扭结型孤波的动力学波形模型,并建立了三维和等高线来表示这些解。这些结果使用双曲线、有理函数和三角函数表示,并使用 Maple 或 Mathematica 以图形表示所获得的解。必须指出的是,所有结果解都直接与原始解进行比较,以确保其精确性。新的广义(G′/G)展开法是分析非线性分数行波的一种可操作、兼容且富有成效的方法。
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.