The propagation of water waves in the nearshore region can be described by depthintegrated Boussinesq-type equations. The dispersive and nonlinear characteristics of the equations are governed by tuneable parameters. We examine the associated linear eigenproblem both analytically and numerically using a spectral element method of arbitrary spatial order p. It is shown that existing sets of parameters, found by optimising the linear dispersion relation, give rise to unbounded eigenspectra which govern stability. For explicit time-stepping schemes the global CFL time-step restriction typically requires Delta t proportional to p(-2). We derive and present conditions on the parameters under which implicitlyimplicit Boussinesq-type equations wil...
For wave tank, coastal and oceanic applications, a fully nonlinear Variational Boussinesq model with...
The Variational Boussinesq Model (VBM) for waves above a layer of ideal fluid conserves mass, moment...
The Variational Boussinesq Model (VBM) for waves above a layer of ideal fluid conserves mass, moment...
For reasons that are clarified in the course of the dissertation, we implement a novel numerical tec...
In this paper, a new Boussinesq water wave theory is derived which can simulate highly dispersive no...
In this thesis the modelling of water wave propagation over uneven bottoms using Boussinesq-like mod...
This contribution concerns a specific simulation method for coastal wave engineering applications. A...
This contribution concerns a specific simulation method for coastal wave engineering applications. A...
Abstract: In this paper we outline the application of spectral/hp element methods for modelling non...
Fully nonlinear extensions of Boussinesq equations are derived to simulate surface wave propagation ...
We present the concept of spectral/hp element methods, i.e. finite element methods of arbitrarily (h...
The Boussinesq equations are a modification of the long wave equations to make some allowance for th...
Accurate simulations of waves in oceanic and coastal areas should take dispersive effects over a lar...
A spectral/hp element method for solving enhanced Boussinesq-type equations in two horizontal dimens...
International audienceThis paper supplements the validation of the fourth-order compact finite volum...
For wave tank, coastal and oceanic applications, a fully nonlinear Variational Boussinesq model with...
The Variational Boussinesq Model (VBM) for waves above a layer of ideal fluid conserves mass, moment...
The Variational Boussinesq Model (VBM) for waves above a layer of ideal fluid conserves mass, moment...
For reasons that are clarified in the course of the dissertation, we implement a novel numerical tec...
In this paper, a new Boussinesq water wave theory is derived which can simulate highly dispersive no...
In this thesis the modelling of water wave propagation over uneven bottoms using Boussinesq-like mod...
This contribution concerns a specific simulation method for coastal wave engineering applications. A...
This contribution concerns a specific simulation method for coastal wave engineering applications. A...
Abstract: In this paper we outline the application of spectral/hp element methods for modelling non...
Fully nonlinear extensions of Boussinesq equations are derived to simulate surface wave propagation ...
We present the concept of spectral/hp element methods, i.e. finite element methods of arbitrarily (h...
The Boussinesq equations are a modification of the long wave equations to make some allowance for th...
Accurate simulations of waves in oceanic and coastal areas should take dispersive effects over a lar...
A spectral/hp element method for solving enhanced Boussinesq-type equations in two horizontal dimens...
International audienceThis paper supplements the validation of the fourth-order compact finite volum...
For wave tank, coastal and oceanic applications, a fully nonlinear Variational Boussinesq model with...
The Variational Boussinesq Model (VBM) for waves above a layer of ideal fluid conserves mass, moment...
The Variational Boussinesq Model (VBM) for waves above a layer of ideal fluid conserves mass, moment...