We consider the problem of solving a linear system Ax = b when A is nearly symmetric and when the system is preconditioned by a symmetric positive definite matrix M . In the symmetric case, one can recover symmetry by using M-inner products in the conjugate gradient (CG) algorithm. This idea can also be used in the nonsymmetric case, and near symmetry can be preserved similarly. Like CG, the new algorithms are mathematically equivalent to split preconditioning, but do not require M to be factored. Better robustness in a specific sense can also be observed. When combined with truncated versions of iterative methods, tests show that this is more effective than the common practice of forfeiting near-symmetry altogether. 1 Introduction Consid...
We revisit real-valued preconditioned iterative methods for the solution of complex linear systems, ...
AbstractIn this paper the preconditioned conjugate gradient method is used to solve the system of li...
Abstract: In the paper we consider the iterative solution of linear systemby the conjugate...
We consider the problem of solving a linear system Ax = b when A is nearly symmetric and when the sy...
In this paper we introduce a parameter dependent class of Krylov-based methods, namely CD, for the s...
Abstract. The Preconditioned Conjugate Gradient (PCG) method has proven to be extremely powerful for...
By considering Krylov subspace methods in nonstandard inner products, we develop in this thesis new ...
In this paper, we introduce a parameter-dependent class of Krylov-based methods, namely Conjugate Di...
Many scientific applications require to solve successively linear systems Ax=b with different right-...
It is widely believed that Krylov subspace iterative methods are better than Chebyshev semi-iterativ...
We consider the problem of solving a symmetric, positive def-inite system of linear equations. The m...
AbstractThe restrictively preconditioned conjugate gradient (RPCG) method for solving large sparse s...
It is widely believed that Krylov subspace iterative methods are better than Chebyshev semi-iterativ...
4Let Ax = b be a linear system where A is a symmetric positive definite matrix. Preconditioners for ...
International audienceMany scientific applications require one to solve successively linear systems ...
We revisit real-valued preconditioned iterative methods for the solution of complex linear systems, ...
AbstractIn this paper the preconditioned conjugate gradient method is used to solve the system of li...
Abstract: In the paper we consider the iterative solution of linear systemby the conjugate...
We consider the problem of solving a linear system Ax = b when A is nearly symmetric and when the sy...
In this paper we introduce a parameter dependent class of Krylov-based methods, namely CD, for the s...
Abstract. The Preconditioned Conjugate Gradient (PCG) method has proven to be extremely powerful for...
By considering Krylov subspace methods in nonstandard inner products, we develop in this thesis new ...
In this paper, we introduce a parameter-dependent class of Krylov-based methods, namely Conjugate Di...
Many scientific applications require to solve successively linear systems Ax=b with different right-...
It is widely believed that Krylov subspace iterative methods are better than Chebyshev semi-iterativ...
We consider the problem of solving a symmetric, positive def-inite system of linear equations. The m...
AbstractThe restrictively preconditioned conjugate gradient (RPCG) method for solving large sparse s...
It is widely believed that Krylov subspace iterative methods are better than Chebyshev semi-iterativ...
4Let Ax = b be a linear system where A is a symmetric positive definite matrix. Preconditioners for ...
International audienceMany scientific applications require one to solve successively linear systems ...
We revisit real-valued preconditioned iterative methods for the solution of complex linear systems, ...
AbstractIn this paper the preconditioned conjugate gradient method is used to solve the system of li...
Abstract: In the paper we consider the iterative solution of linear systemby the conjugate...