AbstractThis paper shows the application of generalized finite difference method (GFDM) to the problem of seismic wave propagation. We investigated stability and star dispersion in 2D.We obtained independent stability conditions and star dispersion of the phase velocity for the P and S waves. Also, P and S waves group velocity dispersion have been obtained
We develop the convergence analysis of discontinuous Galerkin finite element approximations to secon...
We present a new mathematical object designed to analyze the oscillations occurring on both microsco...
AbstractIn this article, a finite difference scheme for coupled nonlinear Schrödinger equations is s...
AbstractThis paper shows the solution to the problem of seismic wave propagation in 2-D using genera...
Este artículo muestra la resolución del problema de propagación de ondas sísmicas en 2-D, mediante l...
International audienceEquivalent boundary Conditions have become a classic notion in the mathematica...
Mixed nite element approximation of reaction front propagation model in porous media is presented. T...
International audienceHybrid meshes comprised of hexahedras and te-trahedras are particularly intere...
The modeling of wave propagation problems using finite element methods usually requires the truncati...
The displacement discontinuity method is a rather standard approach to study cracks in elastic mater...
International audienceIn the most widely used methods for Seismic Imaging, we have to solve 2N wave ...
AbstractDifferent beam propagation methods (BPMs) have been fundamental in modern electromagnetical ...
We study the wave equation on a bounded Lipschitz set, characterizing all homogeneous boundary condi...
International audienceEquivalent boundary Conditions have become a classic notion in the mathematica...
Even if the idea is already very old (proposed first by Moseley in 1965), it offers analytical solut...
We develop the convergence analysis of discontinuous Galerkin finite element approximations to secon...
We present a new mathematical object designed to analyze the oscillations occurring on both microsco...
AbstractIn this article, a finite difference scheme for coupled nonlinear Schrödinger equations is s...
AbstractThis paper shows the solution to the problem of seismic wave propagation in 2-D using genera...
Este artículo muestra la resolución del problema de propagación de ondas sísmicas en 2-D, mediante l...
International audienceEquivalent boundary Conditions have become a classic notion in the mathematica...
Mixed nite element approximation of reaction front propagation model in porous media is presented. T...
International audienceHybrid meshes comprised of hexahedras and te-trahedras are particularly intere...
The modeling of wave propagation problems using finite element methods usually requires the truncati...
The displacement discontinuity method is a rather standard approach to study cracks in elastic mater...
International audienceIn the most widely used methods for Seismic Imaging, we have to solve 2N wave ...
AbstractDifferent beam propagation methods (BPMs) have been fundamental in modern electromagnetical ...
We study the wave equation on a bounded Lipschitz set, characterizing all homogeneous boundary condi...
International audienceEquivalent boundary Conditions have become a classic notion in the mathematica...
Even if the idea is already very old (proposed first by Moseley in 1965), it offers analytical solut...
We develop the convergence analysis of discontinuous Galerkin finite element approximations to secon...
We present a new mathematical object designed to analyze the oscillations occurring on both microsco...
AbstractIn this article, a finite difference scheme for coupled nonlinear Schrödinger equations is s...