AbstractBased on the block-triangular product approximation to a 2-by-2 block matrix, a class of hybrid preconditioning methods is designed for accelerating the MINRES method for solving saddle-point problems. The appropriate values for the parameters involved in the new preconditioners are estimated, so that the numerical conditioning and the spectral property of the saddle-point matrix of the linear system can be substantially improved. Several practical hybrid preconditioners and the corresponding preconditioning iterative methods are constructed and studied, too
Updating preconditioners for the solution of sequences of large and sparse saddle- point linear syst...
This article presents improvements to the hybrid preconditioner previously developed for the solutio...
AbstractIn this paper, we first present a class of structure-oriented hybrid two-stage iteration met...
We investigate the cost of preconditioning when solving large sparse saddlepoint linear systems wit...
AbstractFor large sparse saddle point problems, Chen and Jiang recently studied a class of generaliz...
Iterative methods are currently the solvers of choice for large sparse linear systems of equations. ...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
ABSTRACTThis paper presents a new approach to precondition linear systems of the saddle point kind. ...
Saddle point problems arise frequently in many applications in science and engineering, including co...
The computational time required by interior-point methods is often domi- nated by the solution of li...
AbstractA new sparse approximate triangular factorization technique for solving large sparse linear ...
We investigate the solution of linear systems of saddle point type with an indefinite (1, 1) block b...
We investigate a preconditioning technique applied to the problem of solving linear systems arising ...
Many modern numerical simulations give rise to large sparse linear systems of equa-tions that are be...
We devise a hybrid approach for solving linear systems arising from interior point methods applied t...
Updating preconditioners for the solution of sequences of large and sparse saddle- point linear syst...
This article presents improvements to the hybrid preconditioner previously developed for the solutio...
AbstractIn this paper, we first present a class of structure-oriented hybrid two-stage iteration met...
We investigate the cost of preconditioning when solving large sparse saddlepoint linear systems wit...
AbstractFor large sparse saddle point problems, Chen and Jiang recently studied a class of generaliz...
Iterative methods are currently the solvers of choice for large sparse linear systems of equations. ...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
ABSTRACTThis paper presents a new approach to precondition linear systems of the saddle point kind. ...
Saddle point problems arise frequently in many applications in science and engineering, including co...
The computational time required by interior-point methods is often domi- nated by the solution of li...
AbstractA new sparse approximate triangular factorization technique for solving large sparse linear ...
We investigate the solution of linear systems of saddle point type with an indefinite (1, 1) block b...
We investigate a preconditioning technique applied to the problem of solving linear systems arising ...
Many modern numerical simulations give rise to large sparse linear systems of equa-tions that are be...
We devise a hybrid approach for solving linear systems arising from interior point methods applied t...
Updating preconditioners for the solution of sequences of large and sparse saddle- point linear syst...
This article presents improvements to the hybrid preconditioner previously developed for the solutio...
AbstractIn this paper, we first present a class of structure-oriented hybrid two-stage iteration met...