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Construction of the numerical and analytical wave solutions of the Joseph-Egri dynamical equation for the long waves in nonlinear dispersive systems
Journal article   Peer reviewed

Construction of the numerical and analytical wave solutions of the Joseph-Egri dynamical equation for the long waves in nonlinear dispersive systems

Abdulghani R. Alharbi, M. B. Almatrafi and Aly R. Seadawy
International journal of modern physics. B, Condensed matter physics, statistical physics, applied physics, Vol.34(30), p.2050289
10/12/2020
DOI: https://doi.org/10.1142/S0217979220502896

Abstract

Physical Sciences Physics Physics, Applied Physics, Condensed Matter Physics, Mathematical Science & Technology
The Kudryashov technique is employed to extract several classes of solitary wave solutions for the Joseph-Egri equation. The stability of the achieved solutions is tested. The numerical solution of this equation is also investigated. We also present the accuracy and the stability of the numerical schemes. Some two- and three-dimensional figures are shown to present the solutions on some specific domains. The used methods are found useful to be applied on other nonlinear evolution equations.

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