Finite element methods with stabilization techniques for the stationary Navier–Stokes equations are studied. To solve the stationary Navier–Stokes equations, the Newton method is used. To compute the problem at each step of the nonlinear iteration, a stabilization technique is introduced. The mixed interpolation, which satisfies the inf-sup condition, with stabilized terms is also considered to investigate its computational efficiency. Numerical results show that stabilized terms improve convergences of the Newton method especially in the case of high Reynolds number as well as those of the linear solver at each step of the nonlinear iteration
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
The solution of the stationary Stokes problem through the finite element method using linear element...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...
In this paper we describe a finite element formulation for the numerical solution of the stationary ...
AbstractA finite volume method based on stabilized finite element for the two-dimensional stationary...
summary:We consider numerical approximations of stationary incompressible Navier-Stokes flows in 3D ...
AbstractFormulated in terms of velocity, pressure and the extra stress tensor, the incompressible Na...
lized method Abstract. A new stabilized nite element method is introduced for the linearized version...
A finite element error analysis of a local projection stabilization (LPS) method for the time-depend...
AbstractIn this paper we study a new local stabilized nonconforming finite element method based on t...
Requirements to compute stationary flow patterns are often encountered. With progress of computer en...
Abstract. The numerical solution of the nonstationary, incompressible Navier-Stokes model can be spl...
We the solvability of the two-dimensional stream function-vorticity formulation of the Navier-Stoke...
A numerical simulation of an incompressible viscous flow using the finite element method is presente...
The numerical solution of the nonstationary, incompressible Navier-Stokes model can be split into li...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
The solution of the stationary Stokes problem through the finite element method using linear element...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...
In this paper we describe a finite element formulation for the numerical solution of the stationary ...
AbstractA finite volume method based on stabilized finite element for the two-dimensional stationary...
summary:We consider numerical approximations of stationary incompressible Navier-Stokes flows in 3D ...
AbstractFormulated in terms of velocity, pressure and the extra stress tensor, the incompressible Na...
lized method Abstract. A new stabilized nite element method is introduced for the linearized version...
A finite element error analysis of a local projection stabilization (LPS) method for the time-depend...
AbstractIn this paper we study a new local stabilized nonconforming finite element method based on t...
Requirements to compute stationary flow patterns are often encountered. With progress of computer en...
Abstract. The numerical solution of the nonstationary, incompressible Navier-Stokes model can be spl...
We the solvability of the two-dimensional stream function-vorticity formulation of the Navier-Stoke...
A numerical simulation of an incompressible viscous flow using the finite element method is presente...
The numerical solution of the nonstationary, incompressible Navier-Stokes model can be split into li...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
The solution of the stationary Stokes problem through the finite element method using linear element...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...