Add to ORKGWe propose a fast MATLAB implementation of the mini-element (i.e. P 1-Bubble/P 1) for the finite element approximation of the generalized Stokes equation in 2D and 3D. We use cell arrays to derive vectorized assembling functions. We also propose a Uzawa conjugate gradient method as an iterative solver for the global Stokes system. Numerical experiments show that our implementation has an (almost) optimal time-scaling. For 3D problems, the proposed Uzawa conjugate gradient algorithm outperforms MAT-LAB built-in linear solvers
The stable finite element discretization of the Stokes problem produces a symmetric indefinite syste...
In this paper we develop and analyze a family of mixed finite element methods for the numerical solu...
Two simplifled and stabilized mixed element formats for the Stokes problem are derived by bubble fun...
We propose a vectorized Matlab implementation of the P 1-bubble/P 1 nite element for the two-dimensi...
It is a standard assumption in the error analysis of finite element methods that the underlying fini...
AbstractWe introduce two pairs of stable cheapest nonconforming finite element space pairs to approx...
AbstractIn this work, a numerical scheme is implemented to solve Stokes equations based on cell-cent...
We describe a numerical procedure for solving the stationary two‐dimensional Stokes problem based on...
Abstract. The purpose of this paper is to develop and analyze a multigrid solver for the nite elemen...
We consider a quadrilateral 'mini' finite element for approximating the solution of Stokes equations...
Abstract. We consider saddle point problems that result from the ¯nite element discretization of sta...
A new nite element discretization of the equation grad p = g is introduced. This discretization give...
Abstract. In this note we introduce a new stabilized nite element method for the generalized Stokes ...
Abstract. Discretization of the Stokes equations produces a symmetric indenite system of lin-ear equ...
Some new iterative methods for numerical solution of mixed finite element approximation of Stokes pr...
The stable finite element discretization of the Stokes problem produces a symmetric indefinite syste...
In this paper we develop and analyze a family of mixed finite element methods for the numerical solu...
Two simplifled and stabilized mixed element formats for the Stokes problem are derived by bubble fun...
We propose a vectorized Matlab implementation of the P 1-bubble/P 1 nite element for the two-dimensi...
It is a standard assumption in the error analysis of finite element methods that the underlying fini...
AbstractWe introduce two pairs of stable cheapest nonconforming finite element space pairs to approx...
AbstractIn this work, a numerical scheme is implemented to solve Stokes equations based on cell-cent...
We describe a numerical procedure for solving the stationary two‐dimensional Stokes problem based on...
Abstract. The purpose of this paper is to develop and analyze a multigrid solver for the nite elemen...
We consider a quadrilateral 'mini' finite element for approximating the solution of Stokes equations...
Abstract. We consider saddle point problems that result from the ¯nite element discretization of sta...
A new nite element discretization of the equation grad p = g is introduced. This discretization give...
Abstract. In this note we introduce a new stabilized nite element method for the generalized Stokes ...
Abstract. Discretization of the Stokes equations produces a symmetric indenite system of lin-ear equ...
Some new iterative methods for numerical solution of mixed finite element approximation of Stokes pr...
The stable finite element discretization of the Stokes problem produces a symmetric indefinite syste...
In this paper we develop and analyze a family of mixed finite element methods for the numerical solu...
Two simplifled and stabilized mixed element formats for the Stokes problem are derived by bubble fun...