Integrability, conservation laws and exact solutions for a model equation under non-canonical perturbation expansions

In this paper, the non-linear for the small long amplitude waves in two dimensional (2D) shallow water waves propagation with free surface are considered. The shallow water wave problem leads to the non-linear Hamiltonian model equation. Based on the binary Bell-polynomials approach, the bilinear fo...

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Bibliographic Details
Published in:Journal of geometry and physics 2022-08, Vol.178, p.104581, Article 104581
Main Authors: Wael, Shrouk, Seadawy, Aly R., Moawad, S.M., EL-Kalaawy, O.H.
Format: Article
Language:English
Subjects:
Bäcklund transformation
Conservation laws
Exp [formula omitted]-expansion method
Extended [formula omitted]-expansion method
Hamiltonian mechanics
Multiple wave solution
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Summary:In this paper, the non-linear for the small long amplitude waves in two dimensional (2D) shallow water waves propagation with free surface are considered. The shallow water wave problem leads to the non-linear Hamiltonian model equation. Based on the binary Bell-polynomials approach, the bilinear form, bilinear Bäcklund transformation and multiple wave solutions are obtained. The conservation laws are constructed using two different techniques, namely, the Ibragimov's theorem and the multiplier method. The Noether's approach was applied to the non-linear Hamiltonian model equation to obtain the conservation laws. Also, we show that the non-linear Hamiltonian model equation is nonlinearly self-adjoint. Conserved quantities of Hamiltonian model equation are illustrated. Finally, with the help of the extended homogeneous balance method, and an exponential method, a set of new exact solutions for the non-linear Hamiltonian model equation are obtained. •The Hamiltonian mechanics and Bäcklund transformation are obtained.•Weakly multiple wave solution and conservation laws are deduced.•Mathematical methods applied for NPDE.
ISSN:0393-0440
1879-1662
DOI:10.1016/j.geomphys.2022.104581