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Some New Families of Exact Solitary Wave Solutions for Pseudo-Parabolic Type Nonlinear Modelsopen access

Authors
Hussain, AkhtarAli, HassanUsman, M.Zaman, F. D.Park, Choonkil
Issue Date
Mar-2024
Publisher
Hindawi Publishing Corporation
Citation
Journal of Mathematics, v.2024, pp 1 - 19
Pages
19
Indexed
SCIE
SCOPUS
Journal Title
Journal of Mathematics
Volume
2024
Start Page
1
End Page
19
URI
https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/196974
DOI
10.1155/2024/5762147
ISSN
2314-4629
2314-4785
Abstract
The objective of the current study is to provide a variety of families of soliton solutions to pseudo-parabolic equations that arise in nonsteady flows, hydrostatics, and seepage of fluid through fissured material. We investigate a class of such equations, including the one-dimensional Oskolkov (1D OSK), the Benjamin-Bona-Mahony (BBM), and the Benjamin-Bona-Mahony-Peregrine-Burgers (BBMPB) equation. The Exp (- phi xi )-expansion method is used for new hyperbolic, trigonometric, rational, exponential, and polynomial function-based solutions. These solutions of the pseudo-parabolic class of partial differential equations (PDEs) studied here are new and novel and have not been reported in the literature. These solutions depict the hydrodynamics of various soliton shapes that can be utilized to study the nature of traveling wave solutions of other nonlinear PDE's.
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