Litcius/Paper detail

Variational Principles for Two Kinds of Coupled Nonlinear Equations in Shallow Water

Xiaoqun Cao, Yanan Guo, Shi-Cheng Hou, Cheng-Zhuo Zhang, Kecheng Peng

2020Symmetry21 citationsDOIOpen Access PDF

Abstract

It is a very important but difficult task to seek explicit variational formulations for nonlinear and complex models because variational principles are theoretical bases for many methods to solve or analyze the nonlinear problem. By designing skillfully the trial-Lagrange functional, different groups of variational principles are successfully constructed for two kinds of coupled nonlinear equations in shallow water, i.e., the Broer-Kaup equations and the (2+1)-dimensional dispersive long-wave equations, respectively. Both of them contain many kinds of soliton solutions, which are always symmetric or anti-symmetric in space. Subsequently, the obtained variational principles are proved to be correct by minimizing the functionals with the calculus of variations. The established variational principles are firstly discovered, which can help to study the symmetries and find conserved quantities for the equations considered, and might find lots of applications in numerical simulation.

Topics & Concepts

Nonlinear systemHomogeneous spaceVariational principleSpace (punctuation)SolitonApplied mathematicsMathematicsCalculus of variationsVariational methodConservation lawMathematical analysisComputer sciencePhysicsGeometryQuantum mechanicsOperating systemNonlinear Waves and SolitonsNonlinear Photonic SystemsComputational Fluid Dynamics and Aerodynamics