In this paper, getting an high-efficiency parallel algorithm to solve sparse block pentadiagonal linear systems suitable for vectors and parallel processors, stair matrices are used to construct some parallel polynomial approximate inverse preconditioners. These preconditioners are appropriate when the desired target is to maximize parallelism. Moreover, some theoretical results about these preconditioners are presented and how to construct preconditioners effectively for any nonsingular block pentadiagonal H-matrices is also described. In addition, the availability of these preconditioners is illustrated with some numerical experiments arising from two dimensional biharmonic equation
The class of preconditioning that approximates the inverse of the matrix A is studied in the thesis....
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
We review current methods for preconditioning systems of equations for their solution using iterativ...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
The efficient parallel solution to large sparse linear systems of equations Ax = b is a central issu...
We introduce a novel strategy for parallel preconditioning of large-scale linear systems by means of...
We present three polynomial preconditioning techniques and analyze some of their theoretical and com...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
A popular class of preconditioners is known as incomplete factorizations. They can be thought of as ...
In this report we consider two parallel additive preconditioners for solving block tridiagonal linea...
AbstractAn approach to preconditioning linear systems is presented, which is well suitable for paral...
AbstractWe present the recurrence formulas for computing the approximate inverse factors of tridiago...
This article surveys preconditioning techniques for the iterative solution of large linear systems, ...
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
The class of preconditioning that approximates the inverse of the matrix A is studied in the thesis....
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...
We review current methods for preconditioning systems of equations for their solution using iterativ...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
The efficient parallel solution to large sparse linear systems of equations Ax = b is a central issu...
We introduce a novel strategy for parallel preconditioning of large-scale linear systems by means of...
We present three polynomial preconditioning techniques and analyze some of their theoretical and com...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
A popular class of preconditioners is known as incomplete factorizations. They can be thought of as ...
In this report we consider two parallel additive preconditioners for solving block tridiagonal linea...
AbstractAn approach to preconditioning linear systems is presented, which is well suitable for paral...
AbstractWe present the recurrence formulas for computing the approximate inverse factors of tridiago...
This article surveys preconditioning techniques for the iterative solution of large linear systems, ...
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
The class of preconditioning that approximates the inverse of the matrix A is studied in the thesis....
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
A novel parallel preconditioner for symmetric positive definite matrices is developed coupling a gen...