We introduce a new approach to the computation of gravito-elastic free oscillations or normal modes of spherically symmetric bodies based on a spectral element discretization of the radial ordinary differential equations. Our method avoids numerical instabilities often encountered in the classical method of radial integration and root finding of the characteristic function. To this end, the code is built around a sparse matrix formulation of the eigenvalue problem taking advantage of state-of-the-art parallel iterative solvers. We apply the method to toroidal, spheroidal and radial modes and we demonstrate its versatility in the presence of attenuation, fluid layers and gravity (including the purely elastic case, the Cowling approximation, ...
Sent to Geophysical Journal International on July 29, 2003.This paper deals with the spectral elemen...
An account is given of the minor vector method that allows for the stable numerical integration of t...
There are many important problems related to spherical domains. Most common examples would be the Ea...
A variational type, finite element method is proposed for the study of normal modes of a rotating, l...
International audienceWe present an extension to the coupling scheme of the spectral element method ...
The theory of the Earth's normal modes provides a framework for the calculation of theoretical seism...
International audienceWe present a new method for wave propagation in global earth models based upon...
specnm is a tool for the computation of gravito-elastic free oscillations or normal modes of spheric...
Title: Numerical modeling of free oscillations applied to superconducting-gravimeter data in a low-f...
We present a new method for wave propagation in global Earth models based upon the coupling between ...
Normal mode observations play an important role in studying broad-scale lateral variations in the Ea...
This paper deals with the spectral element modeling of seismic wave propagation at the global scale....
We present the main properties of the spectral-element method, which is well suited for numerical ca...
It is possible to calculate precisely the theoretical eigen-frequencies of any Earth model which is ...
In this paper it is shown that the earth's rigid body (rb) motions can be represented by an ana...
Sent to Geophysical Journal International on July 29, 2003.This paper deals with the spectral elemen...
An account is given of the minor vector method that allows for the stable numerical integration of t...
There are many important problems related to spherical domains. Most common examples would be the Ea...
A variational type, finite element method is proposed for the study of normal modes of a rotating, l...
International audienceWe present an extension to the coupling scheme of the spectral element method ...
The theory of the Earth's normal modes provides a framework for the calculation of theoretical seism...
International audienceWe present a new method for wave propagation in global earth models based upon...
specnm is a tool for the computation of gravito-elastic free oscillations or normal modes of spheric...
Title: Numerical modeling of free oscillations applied to superconducting-gravimeter data in a low-f...
We present a new method for wave propagation in global Earth models based upon the coupling between ...
Normal mode observations play an important role in studying broad-scale lateral variations in the Ea...
This paper deals with the spectral element modeling of seismic wave propagation at the global scale....
We present the main properties of the spectral-element method, which is well suited for numerical ca...
It is possible to calculate precisely the theoretical eigen-frequencies of any Earth model which is ...
In this paper it is shown that the earth's rigid body (rb) motions can be represented by an ana...
Sent to Geophysical Journal International on July 29, 2003.This paper deals with the spectral elemen...
An account is given of the minor vector method that allows for the stable numerical integration of t...
There are many important problems related to spherical domains. Most common examples would be the Ea...