AbstractWe study a model describing a compressible and miscible displacement in a porous medium. It consists of a coupled system of nonlinear parabolic partial differential equations. Using nonclassical estimates and renormalization tools, we prove the existence of relevant weak solutions for the problem. This is the first existence result obtained for a transport model containing both the coupling due to the compressibility assumption and the coupling due to the concentration dependent viscosity
In this paper, an incompressible single phase and single component flow in a porous media presenting...
AbstractWe consider a system of nonlinear coupled partial differential equations that models immisci...
AbstractA boundary initial value problem for a quasi-linear hyperbolic system in one space variable ...
AbstractWe study a model describing a compressible and miscible displacement in a porous medium. It ...
AbstractInitial boundary value problems for a nonlinear differential system of two equations are con...
This thesis documents some recent advances in the mathematical and numerical analysis of a model des...
AbstractWe consider an initial boundary value problem for a nonlinear differential system of two equ...
Abstract. We establish the existence of a solution to a non-linearly coupled elliptic-parabolic syst...
International audienceIn this paper we prove the existence of a solution of a coupled system involvi...
We consider a parabolic-hyperbolic system of nonlinear partial differential equations modeling the m...
Mathematical models of a diffusion-convection in porous media are derived from the homogenization th...
We study unsaturated poroelasticity, i.e., coupled hydro-mechanical processes in variably saturated ...
Abstract. A model is developed for the ow of a slightly compressible uid through a saturated inela...
The convective transport in a multicomponent isothermal compressible fluid subject to the mass conti...
AbstractWe consider a model of flow of two compressible and immiscible phases in a three-dimensional...
In this paper, an incompressible single phase and single component flow in a porous media presenting...
AbstractWe consider a system of nonlinear coupled partial differential equations that models immisci...
AbstractA boundary initial value problem for a quasi-linear hyperbolic system in one space variable ...
AbstractWe study a model describing a compressible and miscible displacement in a porous medium. It ...
AbstractInitial boundary value problems for a nonlinear differential system of two equations are con...
This thesis documents some recent advances in the mathematical and numerical analysis of a model des...
AbstractWe consider an initial boundary value problem for a nonlinear differential system of two equ...
Abstract. We establish the existence of a solution to a non-linearly coupled elliptic-parabolic syst...
International audienceIn this paper we prove the existence of a solution of a coupled system involvi...
We consider a parabolic-hyperbolic system of nonlinear partial differential equations modeling the m...
Mathematical models of a diffusion-convection in porous media are derived from the homogenization th...
We study unsaturated poroelasticity, i.e., coupled hydro-mechanical processes in variably saturated ...
Abstract. A model is developed for the ow of a slightly compressible uid through a saturated inela...
The convective transport in a multicomponent isothermal compressible fluid subject to the mass conti...
AbstractWe consider a model of flow of two compressible and immiscible phases in a three-dimensional...
In this paper, an incompressible single phase and single component flow in a porous media presenting...
AbstractWe consider a system of nonlinear coupled partial differential equations that models immisci...
AbstractA boundary initial value problem for a quasi-linear hyperbolic system in one space variable ...