Add to ORKGWe consider a fully discrete stabilized finite element method for the Navier-Stokes equations which is unconditionally stable and has second order temporal accuracy of O(k2+hk+ spatial error). The method involves a simple artificial viscosity stabilization of the linear system for the approximation of the new time level connected to anti-diffusion of its effects at the old time level, lowering the cell Reynolds number of the Oseen problem to O(1). The method requires only the solution of one linear system (arising from an Oseen problem) per time step
The standard implementation of stabilized finite element methods with a piece-wise function space of...
We propose a stabilized mixed finite element method based on the Scott–Vogelius element for the Osee...
Abstract. The numerical solution of the nonstationary, incompressible Navier-Stokes model can be spl...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
lized method Abstract. A new stabilized nite element method is introduced for the linearized version...
In this paper we describe a finite element formulation for the numerical solution of the stationary ...
In this paper we describe a finite element formulation for the numerical solution of the stationary ...
This paper studies a fully discrete Crank-Nicolson linear extrapolation stabilized finite element me...
We the solvability of the two-dimensional stream function-vorticity formulation of the Navier-Stoke...
CIMNE, Technical Report Nº PI-150, Barcelona, SpainA stabilized finite element formulation for incom...
The numerical solution of the non-stationary, incompressible NavierStokes model can be split into li...
CIMNE, Technical Report Nº PI-150, Barcelona, SpainA stabilized finite element formulation for incom...
summary:We consider numerical approximations of stationary incompressible Navier-Stokes flows in 3D ...
This work is devoted to the finite element discretization of the incompressible Navier--Stokes equat...
The starting point of this paper is the nonstationary, incompressible Navier-Stokes problem ∂tu − ν∆...
The standard implementation of stabilized finite element methods with a piece-wise function space of...
We propose a stabilized mixed finite element method based on the Scott–Vogelius element for the Osee...
Abstract. The numerical solution of the nonstationary, incompressible Navier-Stokes model can be spl...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
lized method Abstract. A new stabilized nite element method is introduced for the linearized version...
In this paper we describe a finite element formulation for the numerical solution of the stationary ...
In this paper we describe a finite element formulation for the numerical solution of the stationary ...
This paper studies a fully discrete Crank-Nicolson linear extrapolation stabilized finite element me...
We the solvability of the two-dimensional stream function-vorticity formulation of the Navier-Stoke...
CIMNE, Technical Report Nº PI-150, Barcelona, SpainA stabilized finite element formulation for incom...
The numerical solution of the non-stationary, incompressible NavierStokes model can be split into li...
CIMNE, Technical Report Nº PI-150, Barcelona, SpainA stabilized finite element formulation for incom...
summary:We consider numerical approximations of stationary incompressible Navier-Stokes flows in 3D ...
This work is devoted to the finite element discretization of the incompressible Navier--Stokes equat...
The starting point of this paper is the nonstationary, incompressible Navier-Stokes problem ∂tu − ν∆...
The standard implementation of stabilized finite element methods with a piece-wise function space of...
We propose a stabilized mixed finite element method based on the Scott–Vogelius element for the Osee...
Abstract. The numerical solution of the nonstationary, incompressible Navier-Stokes model can be spl...