AbstractIn this paper, on the basis of matrix splitting, two preconditioners are proposed and analyzed, for nonsymmetric saddle point problems. The spectral property of the preconditioned matrix is studied in detail. When the iteration parameter becomes small enough, the eigenvalues of the preconditioned matrices will gather into two clusters—one is near (0,0) and the other is near (2,0)—for the PPSS preconditioner no matter whether A is Hermitian or non-Hermitian and for the PHSS preconditioner when A is a Hermitian or real normal matrix. Numerical experiments are given, to illustrate the performances of the two preconditioners
Existing convergence bounds for Krylov subspace methods such as GMRES for nonsymmetric linear system...
In this paper we consider the solution of linear systems of saddle point type by preconditioned Kryl...
AbstractWe study constraint preconditioners for solving singular saddle point problems. We analyze p...
AbstractIn this paper, we consider the Hermitian and skew-Hermitian splitting (HSS) preconditioner f...
For iterative solution of saddle point problems, a nonsymmetric preconditioning is studied which, wi...
In this paper we derive bounds on the eigenvalues of the preconditioned matrix that arises in the so...
In this paper, we study the distribution on the eigenvalues of the preconditioned matrices that aris...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
By considering Krylov subspace methods in nonstandard inner products, we develop in this thesis new ...
The problem of finding good preconditioners for the numerical solution of a certain important class ...
In this article, a parameterized extended shift-splitting (PESS) method and its induced precondition...
For the iterative solution of saddle point problems, a nonsymmetric preconditioner is studied which,...
Abstract For singular nonsymmetric saddle-point problems, a shift-splitting preconditioner was studi...
Saddle point problems arise frequently in many applications in science and engineering, including co...
AbstractIn this paper, two preconditioners based on augmentation are introduced for the solution of ...
Existing convergence bounds for Krylov subspace methods such as GMRES for nonsymmetric linear system...
In this paper we consider the solution of linear systems of saddle point type by preconditioned Kryl...
AbstractWe study constraint preconditioners for solving singular saddle point problems. We analyze p...
AbstractIn this paper, we consider the Hermitian and skew-Hermitian splitting (HSS) preconditioner f...
For iterative solution of saddle point problems, a nonsymmetric preconditioning is studied which, wi...
In this paper we derive bounds on the eigenvalues of the preconditioned matrix that arises in the so...
In this paper, we study the distribution on the eigenvalues of the preconditioned matrices that aris...
Linear systems in saddle point form arise in a wide variety of applications including fluid dynamics...
By considering Krylov subspace methods in nonstandard inner products, we develop in this thesis new ...
The problem of finding good preconditioners for the numerical solution of a certain important class ...
In this article, a parameterized extended shift-splitting (PESS) method and its induced precondition...
For the iterative solution of saddle point problems, a nonsymmetric preconditioner is studied which,...
Abstract For singular nonsymmetric saddle-point problems, a shift-splitting preconditioner was studi...
Saddle point problems arise frequently in many applications in science and engineering, including co...
AbstractIn this paper, two preconditioners based on augmentation are introduced for the solution of ...
Existing convergence bounds for Krylov subspace methods such as GMRES for nonsymmetric linear system...
In this paper we consider the solution of linear systems of saddle point type by preconditioned Kryl...
AbstractWe study constraint preconditioners for solving singular saddle point problems. We analyze p...