Add to ORKGThe first order condition of the constrained minimization problem leads to a saddle point problem. A multigrid method using a multiplicative Schwarz smoother for saddle point problems can thus be interpreted as a successive subspace optimization method based on a multilevel decomposition of the constraint space. Convergence theory is developed for successive subspace optimization methods based on two assumptions on the space decomposition: stable decomposition and strengthened Cauchy-Schwarz inequality, and successfully applied to the saddle point systems arising from mixed finite element methods for Poisson and Stokes equations. Uniform convergence is obtained without the full regularity assumption of the underlying partial differential eq...
. In this paper we consider multigrid algorithms for nonconforming and mixed finite element methods ...
In this paper we consider multigrid methods for the parameter dependent problem of nearly incompress...
summary:We analyze a general multigrid method with aggressive coarsening and polynomial smoothing. W...
We develop new multigrid methods for a class of saddle point problems that include the Stokes system...
Transforming smoothers are known as a successful approach to the multigrid treatment of saddlepoint ...
Based on the theory for multigrid methods with nonnested spaces and noninherited quadratic forms, a ...
Discretizations of partial differential equations by mixed finite element methods result in large sa...
We introduce and study a class of overlapping domain decomposition preconditioners for saddle point ...
Abstract. A multigrid algorithm for saddle point problems arising from mortar finite element discret...
Standard discretizations of Stokes problems lead to linear systems of equations in saddle point form...
We develop multigrid methods for an elliptic distributed optimal control problem on convex domains t...
Multigrid methods applied to standard linear finite element discretizations of linear elliptic two-p...
In these introductory notes, we focus on smooth and piecewise smooth semilinear elliptic partial dif...
We present a multigrid algorithm for the solution of the linear systems of equations stemming from t...
Domain decomposition method for ¯xed-point problems by Lori BADEA ¤ In this paper, we prove the conv...
. In this paper we consider multigrid algorithms for nonconforming and mixed finite element methods ...
In this paper we consider multigrid methods for the parameter dependent problem of nearly incompress...
summary:We analyze a general multigrid method with aggressive coarsening and polynomial smoothing. W...
We develop new multigrid methods for a class of saddle point problems that include the Stokes system...
Transforming smoothers are known as a successful approach to the multigrid treatment of saddlepoint ...
Based on the theory for multigrid methods with nonnested spaces and noninherited quadratic forms, a ...
Discretizations of partial differential equations by mixed finite element methods result in large sa...
We introduce and study a class of overlapping domain decomposition preconditioners for saddle point ...
Abstract. A multigrid algorithm for saddle point problems arising from mortar finite element discret...
Standard discretizations of Stokes problems lead to linear systems of equations in saddle point form...
We develop multigrid methods for an elliptic distributed optimal control problem on convex domains t...
Multigrid methods applied to standard linear finite element discretizations of linear elliptic two-p...
In these introductory notes, we focus on smooth and piecewise smooth semilinear elliptic partial dif...
We present a multigrid algorithm for the solution of the linear systems of equations stemming from t...
Domain decomposition method for ¯xed-point problems by Lori BADEA ¤ In this paper, we prove the conv...
. In this paper we consider multigrid algorithms for nonconforming and mixed finite element methods ...
In this paper we consider multigrid methods for the parameter dependent problem of nearly incompress...
summary:We analyze a general multigrid method with aggressive coarsening and polynomial smoothing. W...