Research ArticleNo Access

Propagation of novel traveling wave envelopes of Zhiber–Shabat equation by using Lie analysis

Asma Rashid Butt

Department of Mathematics, University of Engineering and Technology, Lahore, Pakistan

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Nimra Akram

Department of Mathematics, University of Engineering and Technology, Lahore, Pakistan

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Adil Jhangeer

Department of Mathematics, Namal University, 30KM Talagang Road, Mianwali 42250, Pakistan

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, and

Mustafa Inc

https://orcid.org/0000-0003-4996-8373

Firat University, Science Faculty, Department of Mathematics, 23119 Elazig, Turkey

Department of Medical Research, China Medical University, Taichung, Taiwan

E-mail Address: minc@firat.edu.tr

Corresponding author.

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https://doi.org/10.1142/S0219887823500913Cited by:1 (Source: Crossref)

Abstract

In this paper, we aim to find novel forms of wave structures by employing some innovative ideas. Various solitary wave solutions of the Zhiber–Shabat equation have been extracted using the Lie symmetry analysis and the extended direct algebraic method. In the mathematical community, the considered model has several applications, notably in integral quantum field theory, fluid dynamics, and kink dynamics. First of all, the Lie symmetry has been used to determine the corresponding similarity reductions through similarity variables and wave transformation with the help of optimal systems. Afterward, the method described has been used to create new complex, hyperbolic, rational, and trigonometric forms of solutions to the problem. Depending on the strength of the propagating pulse, these solutions reflect dark, bright, kink-type, and periodic solitary wave envelopes. Further, two-dimensional (2D), three-dimensional (3D), as well as contour 2D graphics of the results have been analyzed by giving some specific values to parameters. At last, sensitivity analysis of the evolution equation has been observed.

Keywords:

AMSC: 35C08, 34C14, 93B25

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