Li, Qinjun and Soybaş, Danyal and Ilhan, Onur Alp and Singh, Gurpreet and Manafian, Jalil and De León, Manuel (2021) Pure Traveling Wave Solutions for Three Nonlinear Fractional Models. Advances in Mathematical Physics, 2021. pp. 1-18. ISSN 1687-9120
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Abstract
Three nonlinear fractional models, videlicet, the space-time fractional (1+1) Boussinesq equation, (2+1)-dimensional breaking soliton equations, and SRLW equation, are the important mathematical approaches to elucidate the gravitational water wave mechanics, the fractional quantum mechanics, the theoretical Huygens’ principle, the movement of turbulent flows, the ion osculate waves in plasma physics, the wave of leading fluid flow, etc. This paper is devoted to studying the dynamics of the traveling wave with fractional conformable nonlinear evaluation equations (NLEEs) arising in nonlinear wave mechanics. By utilizing the oncoming exp ð−Θ(q))-expansion technique, a series of novel exact solutions in terms of rational, periodic, and hyperbolic functions for the fractional cases are derived. These types of long-wave propagation phenomena played a dynamic role to interpret the water waves as well as mathematical physics. Here, the form of the accomplished solutions containing the hyperbolic, rational, and trigonometric functions is obtained. It is demonstrated that our proposed method is further efficient, general, succinct, powerful, and straightforward and can be asserted to install the new exact solutions of different kinds of fractional equations in engineering and nonlinear dynamics.
Item Type: | Article |
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Subjects: | Opene Prints > Mathematical Science |
Depositing User: | Managing Editor |
Date Deposited: | 12 Jan 2023 07:41 |
Last Modified: | 17 Jan 2024 04:13 |
URI: | http://geographical.go2journals.com/id/eprint/1155 |