This paper presents an extension to stabilized methods of the standard technique for the numerical analysis of mixed methods. We prove that the stability of stabilized methods follows from an underlying discrete inf-sup condition, plus a uniform separation property between bubble and velocity finite element spaces. We apply the technique introduced to prove the stability of stabilized spectral element methods so as stabilized solution of the primitive equations of the ocean.Ministerio de Educación y CienciaEuropean Unio
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
In this work, we introduce a discrete specific inf-sup condition to estimate the Lp norm...
AbstractWe use the lowest possible approximation order, piecewise linear, continuous velocities and ...
This paper presents an extension to stabilized methods of the standard technique for the numerical a...
Discretizations of incompressible flow problems with pairs of finite element spaces that do not sati...
We give a brief overview of stabilized finite element methods and illustrate the developments appli...
The simulation of incompressible flow problems with pairs of velocity-pressure finite element spaces...
We propose a stabilized mixed finite element method based on the Scott–Vogelius element for the Osee...
A stabilized finite element formulation for incompressible viscous flows is derived. The starting po...
Fourier analysis techniques are applied to the stabilized finite element method (FEM) recently propo...
We propose a stabilized mixed finite element method based on the ScottVogelius element for the Oseen...
We propose a stabilized finite element method based on the Scott-Vogelius element in combination wit...
In this paper we describe a finite element formulation for the numerical solution of the stationary ...
AbstractThis paper considers a stabilized method based on the difference between a consistent and an...
In this work we propose stabilized finite element methods for Stokes’, Maxwell’s and Darcy’s proble...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
In this work, we introduce a discrete specific inf-sup condition to estimate the Lp norm...
AbstractWe use the lowest possible approximation order, piecewise linear, continuous velocities and ...
This paper presents an extension to stabilized methods of the standard technique for the numerical a...
Discretizations of incompressible flow problems with pairs of finite element spaces that do not sati...
We give a brief overview of stabilized finite element methods and illustrate the developments appli...
The simulation of incompressible flow problems with pairs of velocity-pressure finite element spaces...
We propose a stabilized mixed finite element method based on the Scott–Vogelius element for the Osee...
A stabilized finite element formulation for incompressible viscous flows is derived. The starting po...
Fourier analysis techniques are applied to the stabilized finite element method (FEM) recently propo...
We propose a stabilized mixed finite element method based on the ScottVogelius element for the Oseen...
We propose a stabilized finite element method based on the Scott-Vogelius element in combination wit...
In this paper we describe a finite element formulation for the numerical solution of the stationary ...
AbstractThis paper considers a stabilized method based on the difference between a consistent and an...
In this work we propose stabilized finite element methods for Stokes’, Maxwell’s and Darcy’s proble...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
In this work, we introduce a discrete specific inf-sup condition to estimate the Lp norm...
AbstractWe use the lowest possible approximation order, piecewise linear, continuous velocities and ...