This thesis focuses on the generalization of the NXFEM method proposed by A. and P. Hansbo for elliptic interface problem. Numerical modeling and simulation of flow in fractured media are at the heart of many applications, such as petroleum and porous media (reservoir modeling, presence of faults, signal propagation, identification of layers ...), aerospace (problems of shock, rupture), civil engineering (concrete cracking), but also in cell biology (deformation of red blood cells). In addition, many research projects require the development of robust methods for the consideration of singularities, which is one of the motivations and objectives of the Concha team and of this thesis. First a modification of this method was proposed to obtain...
International audienceIn this paper, we consider triangular nonconforming finite element approximati...
We develop a reliable numerical method to approximate a flow in a porous media, modeled by an ellip...
Abstract. We introduce a new multiscale finite element method which is able to accurately capture so...
This thesis focuses on the generalization of the NXFEM method proposed by A. and P. Hansbo for ellip...
Cette thèse porte sur la généralisation de la méthode NXFEM proposée par A. et P. Hansbo pour le pro...
La modélisation et la simulation numérique des interfaces sont au coeur de nombreuses applications e...
Subsurface flows are influenced by the presence of faults and large fractures which act as preferent...
Nous étudions des méthodes numériques pour la simulation de l'écoulement et du transport de contamin...
International audienceThe aim of the paper is to study the capabilities of the Extended Finite Eleme...
We develop a robust cut finite element method for a model of diffusion in fractured media consisting...
International audienceIn 1999, an extension of the finite element method was introduced. Later calle...
We propose an unfitted finite element method for flow in fractured porous media. The coupling across...
The major part of freshwater comes from sub-surface resources. Our work fits in a process to protect...
International audienceThe extended finite element method XFEM is very efficient to solve problems wh...
This work is dedicated to the introduction of two original fictitious domain methods for the resolut...
International audienceIn this paper, we consider triangular nonconforming finite element approximati...
We develop a reliable numerical method to approximate a flow in a porous media, modeled by an ellip...
Abstract. We introduce a new multiscale finite element method which is able to accurately capture so...
This thesis focuses on the generalization of the NXFEM method proposed by A. and P. Hansbo for ellip...
Cette thèse porte sur la généralisation de la méthode NXFEM proposée par A. et P. Hansbo pour le pro...
La modélisation et la simulation numérique des interfaces sont au coeur de nombreuses applications e...
Subsurface flows are influenced by the presence of faults and large fractures which act as preferent...
Nous étudions des méthodes numériques pour la simulation de l'écoulement et du transport de contamin...
International audienceThe aim of the paper is to study the capabilities of the Extended Finite Eleme...
We develop a robust cut finite element method for a model of diffusion in fractured media consisting...
International audienceIn 1999, an extension of the finite element method was introduced. Later calle...
We propose an unfitted finite element method for flow in fractured porous media. The coupling across...
The major part of freshwater comes from sub-surface resources. Our work fits in a process to protect...
International audienceThe extended finite element method XFEM is very efficient to solve problems wh...
This work is dedicated to the introduction of two original fictitious domain methods for the resolut...
International audienceIn this paper, we consider triangular nonconforming finite element approximati...
We develop a reliable numerical method to approximate a flow in a porous media, modeled by an ellip...
Abstract. We introduce a new multiscale finite element method which is able to accurately capture so...