AbstractWe study convergence conditions for the additive and the multiplicative splitting iteration methods, i.e., two generalizations of the additive and the multiplicative Schwarz iterations, for Hermitian and non-Hermitian systems of linear equations, under an algebraic setting. Theoretical analyses show that when the coefficient and the splitting matrices are Hermitian, or non-Hermitian but diagonalizable, satisfying mild conditions, both additive and multiplicative splitting iteration methods are convergent, even if the coefficient matrix is indefinite
Abstract In this paper, we demonstrate a complete version of the convergence theory of the modulus-b...
AbstractThe study of convergence conditions to solve large and sparse linear systems Ax=b by iterati...
AbstractThe convergence of additive and multiplicative Schwarz methods for computing certain charact...
AbstractWe study convergence conditions for the additive and the multiplicative splitting iteration ...
AbstractNecessary and sufficient convergence conditions are studied for splitting iteration methods ...
The convergence of multiplicative Schwarz-type methods for solving linear systems when the coefficie...
AbstractIn recent years, an algebraic framework was introduced for the analysis of convergence of Sc...
AbstractRecently, Lee et al. [Young-ju Lee, Jinbiao Wu, Jinchao Xu, Ludmil Zikatanov, On the converg...
AbstractIn this paper, we first show that for the stationary iterative methods for solving consisten...
A convergence analysis is presented for additive Schwarz iterations when applied to consistent singu...
Given a nonsingular matrix A, and a matrix T of the same order, under certain very mild conditions, ...
AbstractWe study the convergence properties of the AOR and GAOR iterative methods for the solution o...
We study the convergence of P-regular splitting iterative methods for non-Hermitian positive definit...
AbstractConvergence properties of the nonstationary multisplitting two-stage iteration methods for s...
AbstractWe present sufficient conditions for the convergent splitting of a non-Hermitian positive de...
Abstract In this paper, we demonstrate a complete version of the convergence theory of the modulus-b...
AbstractThe study of convergence conditions to solve large and sparse linear systems Ax=b by iterati...
AbstractThe convergence of additive and multiplicative Schwarz methods for computing certain charact...
AbstractWe study convergence conditions for the additive and the multiplicative splitting iteration ...
AbstractNecessary and sufficient convergence conditions are studied for splitting iteration methods ...
The convergence of multiplicative Schwarz-type methods for solving linear systems when the coefficie...
AbstractIn recent years, an algebraic framework was introduced for the analysis of convergence of Sc...
AbstractRecently, Lee et al. [Young-ju Lee, Jinbiao Wu, Jinchao Xu, Ludmil Zikatanov, On the converg...
AbstractIn this paper, we first show that for the stationary iterative methods for solving consisten...
A convergence analysis is presented for additive Schwarz iterations when applied to consistent singu...
Given a nonsingular matrix A, and a matrix T of the same order, under certain very mild conditions, ...
AbstractWe study the convergence properties of the AOR and GAOR iterative methods for the solution o...
We study the convergence of P-regular splitting iterative methods for non-Hermitian positive definit...
AbstractConvergence properties of the nonstationary multisplitting two-stage iteration methods for s...
AbstractWe present sufficient conditions for the convergent splitting of a non-Hermitian positive de...
Abstract In this paper, we demonstrate a complete version of the convergence theory of the modulus-b...
AbstractThe study of convergence conditions to solve large and sparse linear systems Ax=b by iterati...
AbstractThe convergence of additive and multiplicative Schwarz methods for computing certain charact...