AbstractThe alternating methods for solving the large system of linear equations Ax=b are investigated. The convergence and the monotone convergence theories for the alternating method are formulated when the coefficient matrix is an H-matrix or a monotone matrix. Sufficient conditions are established for the induced splitting by the alternating method to be a regular splitting. Furthermore, new comparison theorems which improve previous comparison theorems are proved and several concrete applications are given
AbstractIn this paper, we study the splitting method and two-stage splitting method for the linear c...
AbstractA new comparison theorem about the parallel nonlinear AOR method [1] is set up, which descri...
Elsner L. Comparisons of weak regular splittings and multisplitting methods. Numerische Mathematik. ...
In this paper, we investigate two parallel alternating methods for solving the system of linear equa...
AbstractWe study convergence conditions for the additive and the multiplicative splitting iteration ...
Given a nonsingular matrix A, and a matrix T of the same order, under certain very mild conditions, ...
In this paper, we give the generalized alternating twostage method in which the inner iterations are...
The so-called parallel multisplitting nonstationary iterative Model A was introduced by Bru, Elsner,...
AbstractA class of parallel multisplitting chaotic relaxation methods is established for the large s...
AbstractIterative methods for the solution of consistent singular systems of linear equations are go...
AbstractThis paper sets up the monotone convergence theory for the two-stage iterative method propos...
AbstractWe study the convergence of nested stationary iterative methods according to Lanzkron, Rose,...
In this paper, we discuss semiconvergence of the alternating iterative methods for solving singular ...
AbstractNecessary and sufficient convergence conditions are studied for splitting iteration methods ...
AbstractThe comparison of the asymptotic rates of convergence of two iteration matrices induced by t...
AbstractIn this paper, we study the splitting method and two-stage splitting method for the linear c...
AbstractA new comparison theorem about the parallel nonlinear AOR method [1] is set up, which descri...
Elsner L. Comparisons of weak regular splittings and multisplitting methods. Numerische Mathematik. ...
In this paper, we investigate two parallel alternating methods for solving the system of linear equa...
AbstractWe study convergence conditions for the additive and the multiplicative splitting iteration ...
Given a nonsingular matrix A, and a matrix T of the same order, under certain very mild conditions, ...
In this paper, we give the generalized alternating twostage method in which the inner iterations are...
The so-called parallel multisplitting nonstationary iterative Model A was introduced by Bru, Elsner,...
AbstractA class of parallel multisplitting chaotic relaxation methods is established for the large s...
AbstractIterative methods for the solution of consistent singular systems of linear equations are go...
AbstractThis paper sets up the monotone convergence theory for the two-stage iterative method propos...
AbstractWe study the convergence of nested stationary iterative methods according to Lanzkron, Rose,...
In this paper, we discuss semiconvergence of the alternating iterative methods for solving singular ...
AbstractNecessary and sufficient convergence conditions are studied for splitting iteration methods ...
AbstractThe comparison of the asymptotic rates of convergence of two iteration matrices induced by t...
AbstractIn this paper, we study the splitting method and two-stage splitting method for the linear c...
AbstractA new comparison theorem about the parallel nonlinear AOR method [1] is set up, which descri...
Elsner L. Comparisons of weak regular splittings and multisplitting methods. Numerische Mathematik. ...