Litcius/Paper detail

Plenty of wave solutions to the ill-posed Boussinesq dynamic wave equation under shallow water beneath gravity

Mostafa M. A. Khater, Suleman H. Alfalqi, Jameel F. Alzaidi, Samir A. Salama, Fuzhang Wang

2021AIMS Mathematics24 citationsDOIOpen Access PDF

Abstract

<abstract><p>This paper applies two computational techniques for constructing novel solitary wave solutions of the ill-posed Boussinesq dynamic wave (IPB) equation. Jacques Hadamard has formulated this model for studying the dynamic behavior of waves in shallow water under gravity. Extended simple equation (ESE) method and novel Riccati expansion (NRE) method have been applied to the investigated model's converted nonlinear ordinary differential equation through the wave transformation. As a result of this research, many solitary wave solutions have been obtained and represented in different figures in two-dimensional, three-dimensional, and density plots. The explanation of the methods used shows their dynamics and effectiveness in dealing with certain nonlinear evolution equations.</p></abstract>

Topics & Concepts

Transformation (genetics)MathematicsNonlinear systemWaves and shallow waterMathematical analysisWave equationRiccati equationSimple (philosophy)Gravitational waveOrdinary differential equationHadamard transformDifferential equationPhysicsEpistemologyBiochemistryChemistryPhilosophyQuantum mechanicsAstrophysicsGeneThermodynamicsNonlinear Waves and SolitonsAdvanced Mathematical Physics ProblemsNonlinear Photonic Systems