The elastic wave equation in spherical coordinates is solved by a Chebyshev spectral method. In the algorithm presented the singularities in the governing equations are avoided by centring the physical domain around the equator. The highly accurate pseudospectral (PS) derivative operators reduce the required grid size compared to ¢nite di¡erence (FD) algorithms. The non-staggered grid scheme allows easy extension to general material anisotropy without additional interpolations being required as in staggered FD schemes. The boundary conditions previously derived for curvilinear coordinate systems can be applied directly to the velocity vector and stress tensor in the spherical basis. The algorithm is applied to the problem of a double-couple...
The development of accurate numerical methods to simulate wave propagation in three-dimensional (3D)...
The plane-wave decomposition of the vertical displacement component of the spherical-wave field corr...
The Spectral-Element Method (SEM) is a finite-element method that solves the wave equa-tion in the t...
In order to understand details in the seismic wave field observed on regional and global scales on t...
compute complete synthetic seismograms and their partial derivatives for laterally heterogeneous mod...
pute complete synthetic seismograms and their partial derivatives for laterally hetero-geneous model...
We portray a dedicated spectral-element method to solve the elastodynamic wave equation upon spheric...
The paper presents a numerical approach called the pseudo-spectral method tc model elastic-wave prop...
Abstract. We use a Spectral-Element Method implemented on the Earth Simulator in Japan to simulate b...
International audienceWe present a new method for wave propagation in global earth models based upon...
International audienceWe portray a dedicated spectral-element method to solve the elastodynamic wave...
For iterative calculations of synthetic seismograms with limited computer resources, a fast and accu...
We present a new method for wave propagation in global Earth models based upon the coupling between ...
Earth structure and dynamics are largely inferred by seismology as the main tool for data-informed p...
International audienceThe development of powerful computer clusters and efficient numerical computat...
The development of accurate numerical methods to simulate wave propagation in three-dimensional (3D)...
The plane-wave decomposition of the vertical displacement component of the spherical-wave field corr...
The Spectral-Element Method (SEM) is a finite-element method that solves the wave equa-tion in the t...
In order to understand details in the seismic wave field observed on regional and global scales on t...
compute complete synthetic seismograms and their partial derivatives for laterally heterogeneous mod...
pute complete synthetic seismograms and their partial derivatives for laterally hetero-geneous model...
We portray a dedicated spectral-element method to solve the elastodynamic wave equation upon spheric...
The paper presents a numerical approach called the pseudo-spectral method tc model elastic-wave prop...
Abstract. We use a Spectral-Element Method implemented on the Earth Simulator in Japan to simulate b...
International audienceWe present a new method for wave propagation in global earth models based upon...
International audienceWe portray a dedicated spectral-element method to solve the elastodynamic wave...
For iterative calculations of synthetic seismograms with limited computer resources, a fast and accu...
We present a new method for wave propagation in global Earth models based upon the coupling between ...
Earth structure and dynamics are largely inferred by seismology as the main tool for data-informed p...
International audienceThe development of powerful computer clusters and efficient numerical computat...
The development of accurate numerical methods to simulate wave propagation in three-dimensional (3D)...
The plane-wave decomposition of the vertical displacement component of the spherical-wave field corr...
The Spectral-Element Method (SEM) is a finite-element method that solves the wave equa-tion in the t...