Add to ORKGA nice perturbation technique was introduced by Axelsson and further developed by Gustafsson to prove that factorization iterative methods are able, under appropriate conditions, to reach a convergence rate larger by an order of magnitude than that of classical schemes. Gustafsson observed however that the perturbations introduced to prove this result seemed actually unnecessary to reach it in practice. In the present work, on the basis of eigenvalue bounds recently obtained by the author, we offer an alternative approach which brings a partial confirmation of Gustafsson's conjecture. © 1985.SCOPUS: ar.jinfo:eu-repo/semantics/publishe
In the references [1, 2, 3] a perturbed iterative scheme (PIS) has been studied both theoretically a...
We present a new method for the evaluation of the change in eigenvalues due to a perturbation of str...
The notion of the radius of convergence in the context of Brillouin-Wigner perturbation theory is cl...
AbstractA nice perturbation technique was introduced by Axelsson and further developed by Gustafsson...
AbstractA nice perturbation technique was introduced by Axelsson and further developed by Gustafsson...
A procedure is set up for obtaining lower eigenvalue bounds for pencils of matrices A-vB where A is ...
AbstractA procedure is set up for obtaining lower eigenvalue bounds for pencils of matrices A—vB whe...
Eigenvalue bounds are obtained for pencils of matrices A - vB where A is a Stieltjes matrix and B is...
The Jacobi–Davidson method is known to converge at least quadratically if the correction equation is...
The Jacobi–Davidson method is known to converge at least quadratically if the correction equation is...
Matrix factorizations are among the most important and basic tools in numerical linear algebra. Pert...
AbstractThe Jacobi–Davidson method is known to converge at least quadratically if the correction equ...
AbstractEigenvalue bounds are obtained for pencils of matrices A − vB where A is a Stieltjes matrix ...
We develop a general approach to convergence analysis of feasible descent methods in the presence of...
Abstract. The Jacobi–Davidson method is known to converge at least quadratically if the correction e...
In the references [1, 2, 3] a perturbed iterative scheme (PIS) has been studied both theoretically a...
We present a new method for the evaluation of the change in eigenvalues due to a perturbation of str...
The notion of the radius of convergence in the context of Brillouin-Wigner perturbation theory is cl...
AbstractA nice perturbation technique was introduced by Axelsson and further developed by Gustafsson...
AbstractA nice perturbation technique was introduced by Axelsson and further developed by Gustafsson...
A procedure is set up for obtaining lower eigenvalue bounds for pencils of matrices A-vB where A is ...
AbstractA procedure is set up for obtaining lower eigenvalue bounds for pencils of matrices A—vB whe...
Eigenvalue bounds are obtained for pencils of matrices A - vB where A is a Stieltjes matrix and B is...
The Jacobi–Davidson method is known to converge at least quadratically if the correction equation is...
The Jacobi–Davidson method is known to converge at least quadratically if the correction equation is...
Matrix factorizations are among the most important and basic tools in numerical linear algebra. Pert...
AbstractThe Jacobi–Davidson method is known to converge at least quadratically if the correction equ...
AbstractEigenvalue bounds are obtained for pencils of matrices A − vB where A is a Stieltjes matrix ...
We develop a general approach to convergence analysis of feasible descent methods in the presence of...
Abstract. The Jacobi–Davidson method is known to converge at least quadratically if the correction e...
In the references [1, 2, 3] a perturbed iterative scheme (PIS) has been studied both theoretically a...
We present a new method for the evaluation of the change in eigenvalues due to a perturbation of str...
The notion of the radius of convergence in the context of Brillouin-Wigner perturbation theory is cl...