We are interested in the modeling of wave propagation in poroelastic media. We consider the biphasic Biot's model in an infinite bilayered medium, with a plane interface. We adopt the Cagniard-De Hoop's technique. This report is devoted to the calculation of analytical solutions in two dimensions. The solutions we present here have been used to validate numerical codes
Présidente : - Michelle Schatzman Rapporteurs : - Guy Chavent - Christophe Hazard - William W. Symes...
To approximate seismic wave propagation in double porosity media, the 2.5-D governing equations of p...
International audienceA time-domain numerical modeling of transversely isotropic Biot ă poroelastic ...
We are interested in the modeling of wave propagation in poroelastic media. We consider the biphasic...
International audienceThanks to the Cagniard-de Hoop we derive the solution to the problem of wave p...
International audienceWave propagation in a stratified fluid / porous medium is studied here using a...
International audienceNumerical methods are developed to simulate the wave propagation in heterogene...
International audienceThis paper deals with the numerical modeling of wave propagation in porous med...
National audienceA numerical method is proposed to simulate the propagation of transient poroelastic...
International audienceA time-domain numerical modeling of transversely isotropic Biot poroelastic wa...
International audienceSemi-analytical and numerical methods are developed to investigate the wave pr...
International audienceAn explicit finite-difference scheme is presented for solving the two-dimensio...
Biot's equations describe the physics of hydromechanically coupled systems establishing the widely r...
Summarization: A particle velocity‐stress, finite‐difference method is developed for the simulation ...
We present a derivation of the equations describing wave propagation in porous media based upon an a...
Présidente : - Michelle Schatzman Rapporteurs : - Guy Chavent - Christophe Hazard - William W. Symes...
To approximate seismic wave propagation in double porosity media, the 2.5-D governing equations of p...
International audienceA time-domain numerical modeling of transversely isotropic Biot ă poroelastic ...
We are interested in the modeling of wave propagation in poroelastic media. We consider the biphasic...
International audienceThanks to the Cagniard-de Hoop we derive the solution to the problem of wave p...
International audienceWave propagation in a stratified fluid / porous medium is studied here using a...
International audienceNumerical methods are developed to simulate the wave propagation in heterogene...
International audienceThis paper deals with the numerical modeling of wave propagation in porous med...
National audienceA numerical method is proposed to simulate the propagation of transient poroelastic...
International audienceA time-domain numerical modeling of transversely isotropic Biot poroelastic wa...
International audienceSemi-analytical and numerical methods are developed to investigate the wave pr...
International audienceAn explicit finite-difference scheme is presented for solving the two-dimensio...
Biot's equations describe the physics of hydromechanically coupled systems establishing the widely r...
Summarization: A particle velocity‐stress, finite‐difference method is developed for the simulation ...
We present a derivation of the equations describing wave propagation in porous media based upon an a...
Présidente : - Michelle Schatzman Rapporteurs : - Guy Chavent - Christophe Hazard - William W. Symes...
To approximate seismic wave propagation in double porosity media, the 2.5-D governing equations of p...
International audienceA time-domain numerical modeling of transversely isotropic Biot ă poroelastic ...