If the nodes for the spectral element method are chosen to be the Gauss-Legendre-Lobatto points and a Lagrange basis is used, then the resulting mass matrix is diagonal and the method is sometimes then described as the Gauss-point mass lumped finite element scheme. We study the dispersive behavior of the scheme in detail and provide both a qualitative description of the nature of the dispersive and dissipative behavior of the scheme along with precise quantitative statements of the accuracy in terms of the mesh-size and the order of the scheme. We prove that (a) the Gauss-point mass lumped scheme (i.e., spectral element method) tends to exhibit phase lag whereas the (consistent) finite element scheme tends to exhibit phase lead; (b) the abs...
We investigate the potential of linear dispersion–diffusion analysis in providing direct guidelines ...
International audienceThis paper aims at studying the influence of material heterogeneity on the sta...
The dispersive properties of high order finite element schemes are analyzed in the setting of the He...
If the nodes for the spectral element method are chosen to be the Gauss-Legendre-Lobatto points and ...
We study the dispersion and dissipation of the numerical scheme obtained by taking a weighted averag...
We investigated one-dimensional numerical dispersion curves and error behaviour of four finite-eleme...
We evaluated the performance of the classical and spectral finite element method in the simulation o...
We evaluated the performance of the classical and spectral finite element method in the simulation o...
In this paper, we focus on the dispersion properties of the partition of unity method. To this end, ...
We analyse the dispersion properties of two types of explicit finite element methods for modelling a...
In this paper, we focus on the dispersion properties of the partition of unity method. To this end, ...
We study the numerical dispersion/dissipation of Triangle-based Spectral Element Methods (T SEM) of...
International audienceStaggered discontinuous Galerkin methods have been developed recently and are ...
This report serves to investigate the relationship between seismic wave propagation among nearby re...
We study the dispersive properties of the acoustic wave equation for finite element, spectral elemen...
We investigate the potential of linear dispersion–diffusion analysis in providing direct guidelines ...
International audienceThis paper aims at studying the influence of material heterogeneity on the sta...
The dispersive properties of high order finite element schemes are analyzed in the setting of the He...
If the nodes for the spectral element method are chosen to be the Gauss-Legendre-Lobatto points and ...
We study the dispersion and dissipation of the numerical scheme obtained by taking a weighted averag...
We investigated one-dimensional numerical dispersion curves and error behaviour of four finite-eleme...
We evaluated the performance of the classical and spectral finite element method in the simulation o...
We evaluated the performance of the classical and spectral finite element method in the simulation o...
In this paper, we focus on the dispersion properties of the partition of unity method. To this end, ...
We analyse the dispersion properties of two types of explicit finite element methods for modelling a...
In this paper, we focus on the dispersion properties of the partition of unity method. To this end, ...
We study the numerical dispersion/dissipation of Triangle-based Spectral Element Methods (T SEM) of...
International audienceStaggered discontinuous Galerkin methods have been developed recently and are ...
This report serves to investigate the relationship between seismic wave propagation among nearby re...
We study the dispersive properties of the acoustic wave equation for finite element, spectral elemen...
We investigate the potential of linear dispersion–diffusion analysis in providing direct guidelines ...
International audienceThis paper aims at studying the influence of material heterogeneity on the sta...
The dispersive properties of high order finite element schemes are analyzed in the setting of the He...