Investigation of shallow water waves near the coast or in lake environments via the KdV-Calogero-Bogoyavlenskii-Schiff equation

TL;DR

This paper investigates the integrability and solutions of the KdV-CBS equation, which models shallow water waves, by deriving new mathematical tools and constructing mixed solutions to better understand wave dynamics in natural environments.

Contribution

It introduces a new bilinear Bäcklund transformation, Lax pair, and conservation laws for the KdV-CBS equation, demonstrating its complete integrability and constructing various solutions.

Findings

Derived a new bilinear Bäcklund transformation for the KdV-CBS equation

Established the Lax pair and infinite conservation laws, proving integrability

Constructed various mixed solutions using Homoclinic test method

Abstract

Shallow water waves phenomena in nature attract the attention of scholars and play an important role in fields such as tsunamis, tidal waves, solitary waves, and hydraulic engineering. Hereby, fortheshallowwaterwavesphenomenainvariousnaturalenvironments, westudytheKdV-Calogero-Bogoyavlenskii-Schiff (KdV-CBS) equation. Based on the binary Bell polynomial theory, a new general bilinear B\"acklund transformation, Lax pair and infinite conservation laws of the KdV-CBS equation are derived, and it is proved that it is completely integrable in Lax pair sense. Various types of mixed solutions are constructed by using a combination of Homoclinic test method and symbolic computations. These findings have important significance for the discipline, offering vital insights into the intricate dynamics of the KdV-CBS equation. We hope that our research results could help the researchers understand the nonlinear complex phenomena of the shallow water waves in oceans, rivers and coastal areas. Furthermore, the present work can be directly applied to other nonlinear equations.