Add to ORKGWe propose two different discrete formulations for the weak imposition of the Neumann boundary conditions of the Darcy flow. The Raviart-Thomas mixed finite element on both triangular and quadrilateral meshes is considered for both methods. One is a consistent discretization depending on a weighting parameter scaling as O(h-1), while the other is a penalty-type formulation obtained as the discretization of a perturbation of the original problem and relies on a parameter scaling as O(h-k-1), k being the order of the Raviart-Thomas space. We rigorously prove that both methods are stable and result in optimal convergent numerical schemes with respect to appropriate mesh-dependent norms, although the chosen norms do not scale as the usual L2-no...
We design and analyze multigrid methods for the saddle point problems resulting from Raviart–Thomas–...
AbstractMixed-hybrid finite element approximation of the potential fluid flow problem leads to the s...
This article is devoted to the a priori error estimates of the fully discrete Crank-Nicolson approxi...
In this work we develop the a priori and a posteriori error analyses of a mixed finite element metho...
In this paper we study the Brinkman model as a unified framework to allow the transition between the...
Key Words: Raviart-Thomas element, quadrilateral grids, finite element methods. A recent study [1] p...
We design stabilized methods based on the variational multiscale decomposition of Darcy's proble...
In this paper we develop the a priori analysis of a mixed finite element method for the coupling of ...
This work aims to introduce and analyze an adaptive stabilized finite element method to solve a nonl...
An a priori analysis for a generalized local projection stabilized finite element solution of the Da...
In this paper we study the Brinkman model as a unified framework to allow the transition between the...
Mixed-hybrid finite element discretization of Darcy's law and the continuity equation that describe ...
AbstractWe use the lowest possible approximation order, piecewise linear, continuous velocities and ...
We consider an incompressible flow problem in a N -dimensional fractured porous domain (Darcy’s prob...
AbstractThis paper presents a comparative study on locally mass-conservative numerical methods for D...
We design and analyze multigrid methods for the saddle point problems resulting from Raviart–Thomas–...
AbstractMixed-hybrid finite element approximation of the potential fluid flow problem leads to the s...
This article is devoted to the a priori error estimates of the fully discrete Crank-Nicolson approxi...
In this work we develop the a priori and a posteriori error analyses of a mixed finite element metho...
In this paper we study the Brinkman model as a unified framework to allow the transition between the...
Key Words: Raviart-Thomas element, quadrilateral grids, finite element methods. A recent study [1] p...
We design stabilized methods based on the variational multiscale decomposition of Darcy's proble...
In this paper we develop the a priori analysis of a mixed finite element method for the coupling of ...
This work aims to introduce and analyze an adaptive stabilized finite element method to solve a nonl...
An a priori analysis for a generalized local projection stabilized finite element solution of the Da...
In this paper we study the Brinkman model as a unified framework to allow the transition between the...
Mixed-hybrid finite element discretization of Darcy's law and the continuity equation that describe ...
AbstractWe use the lowest possible approximation order, piecewise linear, continuous velocities and ...
We consider an incompressible flow problem in a N -dimensional fractured porous domain (Darcy’s prob...
AbstractThis paper presents a comparative study on locally mass-conservative numerical methods for D...
We design and analyze multigrid methods for the saddle point problems resulting from Raviart–Thomas–...
AbstractMixed-hybrid finite element approximation of the potential fluid flow problem leads to the s...
This article is devoted to the a priori error estimates of the fully discrete Crank-Nicolson approxi...