4.5 Article

Painleve integrability and a collection of new wave structures related to an important model in shallow water waves

Journal

COMMUNICATIONS IN THEORETICAL PHYSICS
Volume 75, Issue 7, Pages -

Publisher

IOP Publishing Ltd
DOI: 10.1088/1572-9494/acd999

Keywords

soliton; shallow water waves; singular manifold method; Painleve test

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This paper investigates the perturbed Boussinesq equation in shallow water waves. The equation is significant as it describes various phenomena such as longitudinal waves in bars, long water waves, plasma waves, quantum mechanics, acoustic waves, and nonlinear optics. The study utilizes the singular manifold method and unified techniques to extract hyperbolic, trigonometric, and rational function solutions, which could provide insights into physical incidents. Additionally, the Painleve test is employed to check the integrability of the model, and two-dimensional and three-dimensional plots are used to illustrate the obtained exact solutions' physical behavior.
This paper investigates the perturbed Boussinesq equation that emerges in shallow water waves. The perturbed Boussinesq equation describes the properties of longitudinal waves in bars, long water waves, plasma waves, quantum mechanics, acoustic waves, nonlinear optics, and other phenomena. As a result, the governing model has significant importance in its own right. The singular manifold method and the unified methods are employed in the proposed model for extracting hyperbolic, trigonometric, and rational function solutions. These solutions may be useful in determining the underlying context of the physical incidents. It is worth noting that the executed methods are skilled and effective for examining nonlinear evaluation equations, compatible with computer algebra, and provide a wide range of wave solutions. In addition to this, the Painleve test is also used to check the integrability of the governing model. Two-dimensional and three-dimensional plots are made to illustrate the physical behavior of the newly obtained exact solutions. This makes the study of exact solutions to other nonlinear evaluation equations using the singular manifold method and unified technique prospective and deserving of further study.

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