The Chebyshev semiiterative method (CHSIM) is a powerful method for finding the iterative solution of a nonsymmetric real linear system Ax = b if an ellipse excluding the origin well fits the spectrum of A. The asymptotic rate of convergence of the CHSIM for solving the above system under a perturbation of the foci of the optimal ellipse is studied. Several formulae to approximate the asymptotic rates of convergence, up to the first order of a perturbation, are derived. These generalize the results about the sensitivity of the asymptotic rate of convergence to a perturbation of a real-line segment spectrum by Hageman and Young, and by the first author. A numerical example is given to illustrate the theoretical results
AbstractIn this paper an analysis of a second order Chebyshev semi-iterative method for the p-parame...
Abstract. This study is concerned with k-step methods for the iterative solution of nonsymmet-ric sy...
We introduce a three-step ChebyshevSecant-type method (CSTM) with high efficiency index for solving ...
The Chebyshev semiiterative method (CHSIM) is a powerful method for finding the iterative solution o...
AbstractThe Chebyshev semiiterative method (chsim) is probably the best known and most often used me...
The Chebyshev semiiterative method (chsim) is probably the best known and most often used method for...
AbstractThe asymptotic rate of convergence of an optimal Chebyshev semiiterative method for solving ...
The asymptotic rate of convergence of an optimal Chebyshev semiiterative method for solving a real a...
An optimal Chebyshev method for solving Ax = b, where all the eigenvalues of the real and non-symmet...
AbstractIn this paper we prove a sufficient condition for convergence of Chebyshev semi-iterative (S...
The (2, 2)-step iterative methods related to an optimal Chebyshev method for solving a real and nons...
Let O be a rectangle symmetric with respect to the axes and exclude 1. The asymptotic convergence fa...
AbstractThe (2,2)-step iterative methods related to an optimal Chebyshev method for solving a real a...
The Chebyshev semi-iterative method, CHSIM, is probably the most often used to solve iteratively lin...
Compared to Krylov space methods based on orthogonal or oblique projection, the Chebyshev iteration ...
AbstractIn this paper an analysis of a second order Chebyshev semi-iterative method for the p-parame...
Abstract. This study is concerned with k-step methods for the iterative solution of nonsymmet-ric sy...
We introduce a three-step ChebyshevSecant-type method (CSTM) with high efficiency index for solving ...
The Chebyshev semiiterative method (CHSIM) is a powerful method for finding the iterative solution o...
AbstractThe Chebyshev semiiterative method (chsim) is probably the best known and most often used me...
The Chebyshev semiiterative method (chsim) is probably the best known and most often used method for...
AbstractThe asymptotic rate of convergence of an optimal Chebyshev semiiterative method for solving ...
The asymptotic rate of convergence of an optimal Chebyshev semiiterative method for solving a real a...
An optimal Chebyshev method for solving Ax = b, where all the eigenvalues of the real and non-symmet...
AbstractIn this paper we prove a sufficient condition for convergence of Chebyshev semi-iterative (S...
The (2, 2)-step iterative methods related to an optimal Chebyshev method for solving a real and nons...
Let O be a rectangle symmetric with respect to the axes and exclude 1. The asymptotic convergence fa...
AbstractThe (2,2)-step iterative methods related to an optimal Chebyshev method for solving a real a...
The Chebyshev semi-iterative method, CHSIM, is probably the most often used to solve iteratively lin...
Compared to Krylov space methods based on orthogonal or oblique projection, the Chebyshev iteration ...
AbstractIn this paper an analysis of a second order Chebyshev semi-iterative method for the p-parame...
Abstract. This study is concerned with k-step methods for the iterative solution of nonsymmet-ric sy...
We introduce a three-step ChebyshevSecant-type method (CSTM) with high efficiency index for solving ...