Fully dispersive dynamic models for surface water waves above varying bottom. II: Hybrid spatial-spectral implementations
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Publication:528605
DOI10.1016/j.wavemoti.2011.09.004zbMath1360.76064OpenAlexW2130523816MaRDI QIDQ528605
I. van der Kroon, Embrecht W. C. Van Groesen
Publication date: 16 May 2017
Published in: Wave Motion (Search for Journal in Brave)
Full work available at URL: http://www.sciencedirect.com/science/article/pii/S0165212511001065
sloping bottomvariational modellingfreak wavesAB-equationcoastal waveshybrid spatial-spectral implementation
Related Items (4)
Localization for spatial-spectral implementations of 1D analytic Boussinesq equations ⋮ Fully dispersive dynamic models for surface water waves above varying bottom. I: Model equations ⋮ Optimized variational 1D Boussinesq modelling for broad-band waves over flat bottom ⋮ Localization in Spatial-Spectral Method for Water Wave Applications
Uses Software
Cites Work
- Fully dispersive dynamic models for surface water waves above varying bottom. I: Model equations
- Optimized variational 1D Boussinesq modelling for broad-band waves over flat bottom
- Variational derivation of KdV-type models for surface water waves
- Rogue waves in the ocean
- Numerical simulation of gravity waves
- Accurate modelling of uni-directional surface waves
- Numerical simulation of three-dimensional nonlinear water waves
- Numerical modeling of the KdV random wave field
- A new Boussinesq method for fully nonlinear waves from shallow to deep water
- Oceanic Rogue Waves
- A variational principle for a fluid with a free surface
- On the efficient numerical simulation of directionally spread surface water waves
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