Convex-rogue, half-kink, cusp-soliton and other bidirectional wave-solutions to the generalized Pochhammer-Chree equation

Convex-rogue, half-kink, cusp-soliton and other bidirectional wave-solutions to the generalized Pochhammer-Chree equation

The generalized Pochhammer-Chree equation is considered and studied for different orders of its nonlinearity terms The Kudryashov-expansion method is used and bidirectional kink, singular-kink, rogue-periodic, and V-shaped wave-solutions are obtained. Moreover, we modify the sine-cosine function met...

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Bibliographic Details
Published in:Physica scripta Vol. 97; no. 5; pp. 55203 - 55211
Main Authors: Jaradat, Imad, Alquran, Marwan, Qureshi, Sania, Sulaiman, Tukur A, Yusuf, Abdullahi
Format: Journal Article
Language:English
Published: IOP Publishing 01-05-2022
Subjects:
bidirectional wave-solutions
Kudryashov-expansion method
modified sine-cosine function method
Pochhammer-Chree equation
polynomial function method
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Summary:The generalized Pochhammer-Chree equation is considered and studied for different orders of its nonlinearity terms The Kudryashov-expansion method is used and bidirectional kink, singular-kink, rogue-periodic, and V-shaped wave-solutions are obtained. Moreover, we modify the sine-cosine function method to accommodate the current model and obtain symmetric half-kink, convex-rogue, and cusp bidirectional waves. On the other side, a graphical analysis is conducted to identify the physical shapes of the obtained solutions to the proposed model. Finally, the polynomial function method is implemented to validate the reported solutions.
Bibliography:PHYSSCR-116001.R1
ISSN:0031-8949
1402-4896
DOI:10.1088/1402-4896/ac5f25