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Oceanic shallow-water description with (2 <b>+</b> 1)-dimensional generalized variable-coefficient Hirota–Satsuma–Ito equation: Painlevé analysis, soliton solutions, and lump solutions

Xing Lü, Liang-Li Zhang, Wen-Xiu Ma

2024Physics of Fluids40 citationsDOI

Abstract

Variable-coefficient equations can be used to describe certain phenomena when inhomogeneous media and nonuniform boundaries are taken into consideration. Describing the fluid dynamics of shallow-water wave in an open ocean, a (2 + 1)-dimensional generalized variable-coefficient Hirota–Satsuma–Ito equation is investigated in this paper. The integrability is first examined by the Painlevé analysis method. Secondly, the one-soliton and two-soliton solutions and lump solutions of the (2 + 1)-dimensional generalized variable-coefficient Hirota–Satsuma–Ito equations are derived by virtue of the Hirota bilinear method. In the exact solutions, parameter values and variable-coefficient functions are chosen and analyzed for different effects on the shallow-water waves.

Topics & Concepts

Variable coefficientPhysicsSolitonVariable (mathematics)Waves and shallow waterBilinear formMathematical analysisMathematical physicsBilinear interpolationOne-dimensional spaceQuantum mechanicsThermodynamicsMathematicsNonlinear systemStatisticsNonlinear Waves and SolitonsNonlinear Photonic SystemsFractional Differential Equations Solutions