A comparison theorem for the iterative method with the preconditioner (I + Smax)
Journal of Computational and Applied Mathematics
The convergence of the modified Gauss--Seidel methods for consistent linear systems
Journal of Computational and Applied Mathematics
Block Gauss elimination followed by a classical iterative method for the solution of linear systems
Journal of Computational and Applied Mathematics
Journal of Computational and Applied Mathematics - Special Issue: Proceedings of the 10th international congress on computational and applied mathematics (ICCAM-2002)
Comparison results for solving preconditioned linear systems
Journal of Computational and Applied Mathematics
Convergence analysis of the preconditioned Gauss-Seidel method for H-matrices
Computers & Mathematics with Applications
A note on the preconditioner Pm=(I+Sm)
Journal of Computational and Applied Mathematics
Some preconditioning techniques for linear systems
WSEAS Transactions on Mathematics
Preconditioned AOR iterative methods for M-matrices
Journal of Computational and Applied Mathematics
Two new modified Gauss-Seidel methods for linear system with M-matrices
Journal of Computational and Applied Mathematics
Letter to the Editor: A note on the preconditioned Gauss-Seidel (GS) method for linear systems
Journal of Computational and Applied Mathematics
Hi-index | 7.30 |
In this note recent comparison results for preconditioned Gauss-Seidel (GS) methods are discussed. A new strict comparison result between two different preconditioned GS methods is given, some errors in a recent article by Niki et al. (J. Comput. Appl. Math. 164-165 (2004) 587) are pointed out and a new proof for the corresponding results in Niki et al. is presented.