Different wave structures in water wave mechanics with two conformable models

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Özlem Kırcı, Yusuf Pandır, Hasan Bulut
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引用次数: 0

Abstract

This paper investigates the exact wave solutions of the time-fractional modified Liouville equation (mLE) and time-fractional modified regularized long wave equation (mRLWE) which arise in water wave mechanics, via a new version of trial equation method (NVTEM). The present nonlinear models are reduced to nonlinear ordinary differential equations (NLODEs) by the traveling wave transform and the proposed solution by the NVTEM is used to evaluate the solutions of mLE and mRLWE. This analytical method is not applied before to these equations and novel wave solutions are acquired in the form of rational, exponential, hyperbolic, and Jacobi elliptic types. The solitary solutions of the equations under consideration make them essential models in shallow water dynamics, in liquids and gas bubbles, in magneto-hydrodynamics, and in plasma. This fact has become a motivation for this research.

Abstract Image

水波力学中的不同波浪结构与两种符合模型
本文通过新版试验方程法(NVTEM)研究了水波力学中出现的时分数修正柳维尔方程(mLE)和时分数修正正则化长波方程(mRLWE)的精确波解。通过行波变换将目前的非线性模型还原为非线性常微分方程(NLODE),并利用 NVTEM 提出的解法评估 mLE 和 mRLWE 的解。这种分析方法以前从未应用于这些方程,而且获得了有理型、指数型、双曲型和雅可比椭圆型等形式的新颖波解。所研究方程的孤解使其成为浅水动力学、液体和气泡、磁流体力学和等离子体的重要模型。这一事实成为本研究的动机。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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