For seismic modelling, imaging and inversion, finite-difference methods are still the workhorse of the industry despite their inability to meet the increasing demand for improved accuracy in subsurface imaging. Finiteelement methods offer better accuracy but at a higher computational cost. A stress-velocity formulation with linear elements and an iterative method, defect correction, for inverting the mass matrix offers fourth-order super-convergence but is susceptible to numerical noise if waves in the wrong part of the dispersion curve are excited. We propose an improved source term that reduces that noise and investigate the accuracy of the method on structured triangular meshes as well as on unstructured rotated meshes. With an optimised...
<jats:p> The Generalized Finite Element Method (GFEM) has been applied frequently to solve har...
International audienceThe analysis of wave propagation problems in linear damped media must take int...
A family of numerical schemes, based on finite difference operators is introduced for the computatio...
For seismic modelling, imaging and inversion, finite-difference methods are still the workhorse of t...
Demand for hydrocarbon fuel is predicted to keep increasing in the coming decades in spite of easily...
In this dissertation, new and more efficient finite element methods for modelling seismic wave propa...
Finite-element discretizations of the acoustic wave equation in the time domain often employ mass lu...
International audienceMany scientific applications require accurate modeling of seismic wave propaga...
The finite element method (FEM) can accurately calculate seismic ground motions for complex topograp...
Modeling dynamic and static responses of an elastic medium often employs different numerical schemes...
Finite elements can, in some cases, outperform finite-difference methods for modelling wave propagat...
Abstract. The spatial discretization of elastic continuum by finite element method (FEM) in-troduces...
We investigated one-dimensional numerical dispersion curves and error behaviour of four finite-eleme...
Seismograms (i.e., recordings of seismic waves that propagate through the earth) can be used to unco...
The second-order formulation of the wave equation is often used for spectral-element discretizations...
<jats:p> The Generalized Finite Element Method (GFEM) has been applied frequently to solve har...
International audienceThe analysis of wave propagation problems in linear damped media must take int...
A family of numerical schemes, based on finite difference operators is introduced for the computatio...
For seismic modelling, imaging and inversion, finite-difference methods are still the workhorse of t...
Demand for hydrocarbon fuel is predicted to keep increasing in the coming decades in spite of easily...
In this dissertation, new and more efficient finite element methods for modelling seismic wave propa...
Finite-element discretizations of the acoustic wave equation in the time domain often employ mass lu...
International audienceMany scientific applications require accurate modeling of seismic wave propaga...
The finite element method (FEM) can accurately calculate seismic ground motions for complex topograp...
Modeling dynamic and static responses of an elastic medium often employs different numerical schemes...
Finite elements can, in some cases, outperform finite-difference methods for modelling wave propagat...
Abstract. The spatial discretization of elastic continuum by finite element method (FEM) in-troduces...
We investigated one-dimensional numerical dispersion curves and error behaviour of four finite-eleme...
Seismograms (i.e., recordings of seismic waves that propagate through the earth) can be used to unco...
The second-order formulation of the wave equation is often used for spectral-element discretizations...
<jats:p> The Generalized Finite Element Method (GFEM) has been applied frequently to solve har...
International audienceThe analysis of wave propagation problems in linear damped media must take int...
A family of numerical schemes, based on finite difference operators is introduced for the computatio...