In this work, we numerically study the higher-ordered/extended Boussinesq system describing the propagation of water-waves over flat topography. A reformulation of the same order of precision that avoids the calculation of high order derivatives on the surface deformation is proposed. We show that this formulation enjoys an extended range of applicability while remaining stable. Moreover, a significant improvement in terms of linear dispersive properties in high frequency regime is made due to the suitable adjustment of a dispersion correction parameter. We develop a second order splitting scheme where the hyperbolic part of the system is treated with a high-order finite volume scheme and the dispersive part is treated with a finite differe...
Intermediate-depth, Boussinesq-type modelling is used to generalize previously known results for sur...
International audienceOne of the features of Boussinesq-type models for dispersive wave propagation ...
In this paper we propose a new model based on a contravariant integral form of the fully non-linear ...
In this thesis the modelling of water wave propagation over uneven bottoms using Boussinesq-like mod...
This study deals with higher-order asymptotic equations for the water-waves problem. We considered t...
Based on the Boussinesq type equations with the second order nonlinearity and dispersion,an improved...
In this paper, a new Boussinesq water wave theory is derived which can simulate highly dispersive no...
A hybrid scheme composed of finite-volume and finite-difference methods is introduced for the soluti...
A hybrid scheme composed of finite-volume and finite-difference methods is introduced for the soluti...
In this paper we consider the solution of the enhanced Boussinesq equations of Madsen and S$\oo$rens...
An improved class of Boussinesq systems of an arbitrary order using a wave surface elevation and vel...
The interplay between low and high frequency waves is groundwork for the near-shore hydrodynamics fo...
A numerical scheme for solving the class of extended Boussinesq equations is presented. Unlike previ...
Summarization: A formally fourth-order well-balanced hybrid finite volume/difference (FV/FD) numeric...
A formally fourth-order well-balanced hybrid finite volume/difference (FV/FD) numerical scheme for a...
Intermediate-depth, Boussinesq-type modelling is used to generalize previously known results for sur...
International audienceOne of the features of Boussinesq-type models for dispersive wave propagation ...
In this paper we propose a new model based on a contravariant integral form of the fully non-linear ...
In this thesis the modelling of water wave propagation over uneven bottoms using Boussinesq-like mod...
This study deals with higher-order asymptotic equations for the water-waves problem. We considered t...
Based on the Boussinesq type equations with the second order nonlinearity and dispersion,an improved...
In this paper, a new Boussinesq water wave theory is derived which can simulate highly dispersive no...
A hybrid scheme composed of finite-volume and finite-difference methods is introduced for the soluti...
A hybrid scheme composed of finite-volume and finite-difference methods is introduced for the soluti...
In this paper we consider the solution of the enhanced Boussinesq equations of Madsen and S$\oo$rens...
An improved class of Boussinesq systems of an arbitrary order using a wave surface elevation and vel...
The interplay between low and high frequency waves is groundwork for the near-shore hydrodynamics fo...
A numerical scheme for solving the class of extended Boussinesq equations is presented. Unlike previ...
Summarization: A formally fourth-order well-balanced hybrid finite volume/difference (FV/FD) numeric...
A formally fourth-order well-balanced hybrid finite volume/difference (FV/FD) numerical scheme for a...
Intermediate-depth, Boussinesq-type modelling is used to generalize previously known results for sur...
International audienceOne of the features of Boussinesq-type models for dispersive wave propagation ...
In this paper we propose a new model based on a contravariant integral form of the fully non-linear ...