Abstract — We experimentally examine the performance of preconditioners based on entries of the symmetric positive definite part and small subspace solvers for linear system of equations obtained from the high-order compact discretization of convection-diffusion equations. Numerical results are described to illustrate that the preconditioned GMRES algorithm converges in a reasonable number of iterations
In this manuscript, we describe effective solvers for the optimal control of stabilized convectiondi...
International audienceA new domain decomposition preconditioner is introduced for efficiently solvin...
Iterative methods for solving large-scale linear systems have been gaining popularity in many areas ...
AbstractThe subject of this paper is an additive multilevel preconditioning approach for convection-...
We study the role of preconditioning strategies recently developed for coercive problems in connecti...
AbstractIterative methods preconditioned by incomplete factorizations and sparse approximate inverse...
This paper presents a novel class of preconditioners for the iterative solution of the sequence of s...
We consider the system of equations arising from finite difference discretization of a three-dimensi...
For an iterative solution of strongly nonsymmetric systems of linear algebraic equations we propose ...
AbstractWe study some properties of block-circulant preconditioners for high-order compact approxima...
In this article we introduce new bounds on the effective condition number of deflated and preconditi...
Abstract. We develop a simple algorithmic framework to solve large-scale symmetric positive definite...
In this paper, first, by using the diagonally compensated reduction and incomplete Cholesky factoriz...
AbstractWe consider the system of equations arising from finite difference discretization of a three...
We consider the iterative solution of algebraic systems, arising in optimal control problems constra...
In this manuscript, we describe effective solvers for the optimal control of stabilized convectiondi...
International audienceA new domain decomposition preconditioner is introduced for efficiently solvin...
Iterative methods for solving large-scale linear systems have been gaining popularity in many areas ...
AbstractThe subject of this paper is an additive multilevel preconditioning approach for convection-...
We study the role of preconditioning strategies recently developed for coercive problems in connecti...
AbstractIterative methods preconditioned by incomplete factorizations and sparse approximate inverse...
This paper presents a novel class of preconditioners for the iterative solution of the sequence of s...
We consider the system of equations arising from finite difference discretization of a three-dimensi...
For an iterative solution of strongly nonsymmetric systems of linear algebraic equations we propose ...
AbstractWe study some properties of block-circulant preconditioners for high-order compact approxima...
In this article we introduce new bounds on the effective condition number of deflated and preconditi...
Abstract. We develop a simple algorithmic framework to solve large-scale symmetric positive definite...
In this paper, first, by using the diagonally compensated reduction and incomplete Cholesky factoriz...
AbstractWe consider the system of equations arising from finite difference discretization of a three...
We consider the iterative solution of algebraic systems, arising in optimal control problems constra...
In this manuscript, we describe effective solvers for the optimal control of stabilized convectiondi...
International audienceA new domain decomposition preconditioner is introduced for efficiently solvin...
Iterative methods for solving large-scale linear systems have been gaining popularity in many areas ...