Add to ORKGSaddle point problems arise frequently in many applications in science and engineering, including constrained optimization, mixed finite element formulations of partial differential equations, circuit analysis, and so forth. Indeed the formulation of most problems with constraints gives rise to saddle point systems. This paper provides a concise overview of iterative approaches for the solution of such systems which are of particular importance in the context of large scale computation. In particular we describe some of the most useful preconditioning techniques for Krylov subspace solvers applied to saddle point problems, including block and constrained preconditioners.\ud \ud The work of Michele Benzi was supported in part by the National...
We investigate the cost of preconditioning when solving large sparse saddlepoint linear systems wit...
The solution of quadratic or locally quadratic extremum problems subject to linear(ized) constraints...
The solution of quadratic or locally quadratic extremum problems subject to linear(ized) constraints...
Saddle point problems arise frequently in many applications in science and engineering, including co...
The problem of finding good preconditioners for the numerical solution of a certain important class ...
Generalized saddle point problems arise in a number of applications, ranging from optimization and m...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
AbstractWe study constraint preconditioners for solving singular saddle point problems. We analyze p...
We consider the iterative solution of a class of linear systems with double saddle point structure. ...
In this contribution we attempt to review recent advances in the field of iterative methods for solv...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
We investigate the cost of preconditioning when solving large sparse saddlepoint linear systems wit...
The solution of quadratic or locally quadratic extremum problems subject to linear(ized) constraints...
The solution of quadratic or locally quadratic extremum problems subject to linear(ized) constraints...
Saddle point problems arise frequently in many applications in science and engineering, including co...
The problem of finding good preconditioners for the numerical solution of a certain important class ...
Generalized saddle point problems arise in a number of applications, ranging from optimization and m...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
AbstractWe study constraint preconditioners for solving singular saddle point problems. We analyze p...
We consider the iterative solution of a class of linear systems with double saddle point structure. ...
In this contribution we attempt to review recent advances in the field of iterative methods for solv...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
We investigate the cost of preconditioning when solving large sparse saddlepoint linear systems wit...
The solution of quadratic or locally quadratic extremum problems subject to linear(ized) constraints...
The solution of quadratic or locally quadratic extremum problems subject to linear(ized) constraints...