AbstractThis paper presents a class of preconditioning techniques which exploit rational function approximations to the inverse of the original matrix. The matrix is first shifted and then an incomplete LU factorization of the resulting matrix is computed. The resulting factors are then used to compute a better preconditioner for the original matrix. Since the incomplete factorization is made on a shifted matrix, a good LU factorization is obtained without allowing much fill-in. The result needs to be extrapolated to the nonshifted matrix. Thus, the main motivation for this process is to save memory. The method is useful for matrices whose incomplete LU factorizations are poor, e.g., unstable
Although some preconditioners are available for solving dense linear systems, there are still many m...
We review current methods for preconditioning systems of equations for their solution using iterativ...
Abstract. We investigate the use of sparse approximate-inverse preconditioners for the iterative sol...
. This paper is concerned with a new approach to preconditioning for large, sparse linear systems. A...
This paper is concerned with a new approach to preconditioning for large, sparse linear systems. A p...
A sparse approximate inverse technique is introduced to solve general sparse linear systems. The spa...
Incomplete LU factorization is a valuable preconditioning approach for sparse iterative solvers. An ...
onditioners, or incomplete LU-decompositions of A [2]. But these preconditioners either lead to unsa...
A popular class of preconditioners is known as incomplete factorizations. They can be thought of as ...
Iterative methods are currently the solvers of choice for large sparse linear systems of equations. ...
This article surveys preconditioning techniques for the iterative solution of large linear systems, ...
The efficient parallel solution to large sparse linear systems of equations Ax = b is a central issu...
A number of recently proposed preconditioning techniques based on sparse approximate inverses are co...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
AbstractA new sparse approximate triangular factorization technique for solving large sparse linear ...
Although some preconditioners are available for solving dense linear systems, there are still many m...
We review current methods for preconditioning systems of equations for their solution using iterativ...
Abstract. We investigate the use of sparse approximate-inverse preconditioners for the iterative sol...
. This paper is concerned with a new approach to preconditioning for large, sparse linear systems. A...
This paper is concerned with a new approach to preconditioning for large, sparse linear systems. A p...
A sparse approximate inverse technique is introduced to solve general sparse linear systems. The spa...
Incomplete LU factorization is a valuable preconditioning approach for sparse iterative solvers. An ...
onditioners, or incomplete LU-decompositions of A [2]. But these preconditioners either lead to unsa...
A popular class of preconditioners is known as incomplete factorizations. They can be thought of as ...
Iterative methods are currently the solvers of choice for large sparse linear systems of equations. ...
This article surveys preconditioning techniques for the iterative solution of large linear systems, ...
The efficient parallel solution to large sparse linear systems of equations Ax = b is a central issu...
A number of recently proposed preconditioning techniques based on sparse approximate inverses are co...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
AbstractA new sparse approximate triangular factorization technique for solving large sparse linear ...
Although some preconditioners are available for solving dense linear systems, there are still many m...
We review current methods for preconditioning systems of equations for their solution using iterativ...
Abstract. We investigate the use of sparse approximate-inverse preconditioners for the iterative sol...