A Numerical Study of the Exact Evolution Equations for Surface Waves in Water of Finite Depth
From MaRDI portal
Publication:3522223
DOI10.1111/j.0022-2526.2004.01534.xzbMath1141.76352OpenAlexW1518826928MaRDI QIDQ3522223
Wooyoung Choi, Yi A. Li, James M. Hyman
Publication date: 1 September 2008
Published in: Studies in Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1111/j.0022-2526.2004.01534.x
Spectral, collocation and related methods for boundary value problems involving PDEs (65N35) Water waves, gravity waves; dispersion and scattering, nonlinear interaction (76B15) Spectral methods applied to problems in fluid mechanics (76M22)
Related Items
Conservative discontinuous Galerkin methods for the nonlinear Serre equations ⋮ Linear stability of finite-amplitude capillary waves on water of infinite depth ⋮ Dynamics of steep two-dimensional gravity–capillary solitary waves ⋮ Evolution equation for short surface waves on water of finite depth ⋮ Time-dependent conformal mapping of doubly-connected regions ⋮ A locally conservative eulerian-Lagrangian finite difference method for the forced KdV equation ⋮ Numerical algorithms for water waves with background flow over obstacles and topography ⋮ The Whitham equation as a model for surface water waves ⋮ Finite depth gravity water waves in holomorphic coordinates ⋮ High-order strongly nonlinear long wave approximation and solitary wave solution ⋮ The Whitham equation with surface tension ⋮ Error Estimates for Galerkin Approximations of the Serre Equations ⋮ On the nonlinear dynamics of the traveling-wave solutions of the Serre system ⋮ Hydroelastic solitary waves with constant vorticity ⋮ Recent advances in Serre-Green-Naghdi modelling for wave transformation, breaking and runup processes ⋮ Time-accurate stabilized finite-element model for weakly nonlinear and weakly dispersive water waves ⋮ Efficient computation of steady solitary gravity waves ⋮ On Stabilizing the Strongly Nonlinear Internal Wave Model ⋮ A comparative study of bi-directional Whitham systems ⋮ Capillary-gravity waves on a dielectric fluid of finite depth under normal electric field ⋮ Conservative modified Serre-Green-Naghdi equations with improved dispersion characteristics ⋮ Spatially quasi-periodic water waves of infinite depth ⋮ A plethora of generalised solitary gravity–capillary water waves ⋮ A shallow‐water approximation to the full water wave problem ⋮ Nonlinear surface waves interacting with a linear shear current ⋮ Quasi-periodic travelling gravity–capillary waves ⋮ Finite volume and pseudo-spectral schemes for the fully nonlinear 1D Serre equations ⋮ On the Galilean Invariance of Some Nonlinear Dispersive Wave Equations ⋮ Hamiltonian formulation of the extended Green-Naghdi equations
Cites Work
- Numerical simulation of gravity waves
- Overtaking collision between two solitary waves
- A Fourier method for solving nonlinear water-wave problems: application to solitary-wave interactions
- A high-order spectral method for the study of nonlinear gravity waves
- On head-on collisions between two solitary waves
- On periodic water-waves and their convergence to solitary waves in the long-wave limit
- On the mass, momentum, energy and circulation of a solitary wave
- On the mass, momentum, energy and circulation of a solitary wave. II
- The deformation of steep surface waves on water - I. A numerical method of computation
- A derivation of equations for wave propagation in water of variable depth
- The existence of solitary water waves
- Hamiltonian structure, symmetries and conservation laws for water waves
- Korteweg-de Vries Equation and Generalizations. III. Derivation of the Korteweg-de Vries Equation and Burgers Equation
- A fully nonlinear Boussinesq model for surface waves. Part 1. Highly nonlinear unsteady waves
- Nonlinear evolution equations for two-dimensional surface waves in a fluid of finite depth
- The existence of solitary waves
