ON THE PHYSICAL BEHAVIOURS OF THE CONFORMABLE FRACTIONAL MODIFIED CAMASSA– HOLM EQUATION USING TWO EFFICIENT METHODS

IF 0.2 Q4 MATHEMATICS

International Journal of Mathematics and Physics Pub Date : 2021-06-01 DOI:10.26577/ijmph.2021.v12.i1.03

Berfin Elma, E. Mısırlı

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Abstract

In recent years, many authors have researched about fractional partial differential equations. Physical phenomena, which arise in engineering and applied science, can be defined more accurately by using FPDEs. Thus, obtaining exact solutions of the FPDEs equations have become more important to understand physical problems. In this article, we have reached the new traveling wave solutions of the conformable fractional modified Camassa – Holm equation via two efficient methods such as first integral method and the functional variable method. The wave transformation and conformable fractional derivative have been used to convert FPDE to the ordinary differential equation. The Camassa – Holm equation is physical model of shallow water waves with non-hydrostatic pressure. Thanks to these powerful methods, some comparisons, such as type of solutions and physical behaviours, have been made. Additionally, mathematica program have been used with the aim of checking of solutions. Investigating results of the fractional differential equations can help understanding complex phenomena in applied mathematics and physics.

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用两种有效方法研究可调分数阶修正camassa - holm方程的物理行为

近年来，许多学者对分数阶偏微分方程进行了研究。在工程和应用科学中出现的物理现象，通过使用fpga可以更准确地定义。因此，获得FPDEs方程的精确解对于理解物理问题变得更加重要。本文利用一阶积分法和泛函变量法两种有效的方法，得到了符合分数阶修正Camassa - Holm方程的行波解。利用波动变换和适形分数阶导数将FPDE转化为常微分方程。Camassa - Holm方程是具有非静水压力的浅水波浪的物理模型。由于这些强大的方法，一些比较，如类型的解决方案和物理行为，已经作出。此外，还使用了mathematica程序对解进行校核。研究分数阶微分方程的结果有助于理解应用数学和物理中的复杂现象。

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

International Journal of Mathematics and Physics Multiple-

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0.30

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