In this paper, we discuss various techniques for solving the system of linear equations that arise from the discretization of the incompressible Stokes equations by the finite-element method. The proposed solution methods, based on a suitable approximation of the Schur-complement matrix, are shown to be very effective for a variety of problems. In this paper, we discuss three types of iterative methods. Two of these approaches use the pressure mass matrix as preconditioner (or an approximation) to the Schur complement, whereas the third uses an approximation based on the ideas of least-squares commutators (LSC). We observe that the approximation based on the pressure mass matrix gives h-independent convergence, for both constant and variabl...
SIGLECNRS-CDST / INIST-CNRS - Institut de l'Information Scientifique et TechniqueFRFranc
The solution of the stationary Stokes problem through the finite element method using linear element...
We present optimal preconditioners for a recently introduced hybridized discontinuous Galerkin finit...
In this paper, we discuss various techniques for solving the system of linear equations that arise f...
AbstractIn this paper, we consider solving the coupled systems of discrete equations which arise fro...
The focus of this work is on numerical solution methods for solving the incompressible Navier-Stokes...
This thesis approaches the solution of the linearized finite element discretization of the Navier-St...
A new adaptive finite element method for solving the Stokes equations is developed, which is shown t...
We discuss iterative methods for solving the algebraic systems of equations arising from linearizati...
The objective of this paper is to analyse an iterative procedure for the finite element solution of ...
The goal of this thesis is to illustrate the effectiveness of iterative methods on the discretized N...
Abstract. We consider saddle point problems that result from the ¯nite element discretization of sta...
Thesis: S.M., Massachusetts Institute of Technology, Computation for Design and Optimization Program...
Abstract. A simple algorithm of iterative substructuring method as the same way of elasticity proble...
In this paper we consider the application of least-squares principles to the approximate solution of...
SIGLECNRS-CDST / INIST-CNRS - Institut de l'Information Scientifique et TechniqueFRFranc
The solution of the stationary Stokes problem through the finite element method using linear element...
We present optimal preconditioners for a recently introduced hybridized discontinuous Galerkin finit...
In this paper, we discuss various techniques for solving the system of linear equations that arise f...
AbstractIn this paper, we consider solving the coupled systems of discrete equations which arise fro...
The focus of this work is on numerical solution methods for solving the incompressible Navier-Stokes...
This thesis approaches the solution of the linearized finite element discretization of the Navier-St...
A new adaptive finite element method for solving the Stokes equations is developed, which is shown t...
We discuss iterative methods for solving the algebraic systems of equations arising from linearizati...
The objective of this paper is to analyse an iterative procedure for the finite element solution of ...
The goal of this thesis is to illustrate the effectiveness of iterative methods on the discretized N...
Abstract. We consider saddle point problems that result from the ¯nite element discretization of sta...
Thesis: S.M., Massachusetts Institute of Technology, Computation for Design and Optimization Program...
Abstract. A simple algorithm of iterative substructuring method as the same way of elasticity proble...
In this paper we consider the application of least-squares principles to the approximate solution of...
SIGLECNRS-CDST / INIST-CNRS - Institut de l'Information Scientifique et TechniqueFRFranc
The solution of the stationary Stokes problem through the finite element method using linear element...
We present optimal preconditioners for a recently introduced hybridized discontinuous Galerkin finit...