论文信息 - On the convergence of parallel nonstationary multisplitting iteration methods

On the convergence of parallel nonstationary multisplitting iteration methods

The convergence properties of a variant of the parallel chaotic multisplitting iteration method, called the nonstationary multisplitting iteration method, for solving large sparse systems of linear equations are further discussed when the coefficient matrix is an H-matrix or a positive definite matrix, respectively. Moreover, when the coefficient matrix is a monotone matrix, the monotone convergence theory and the monotone comparison theorem about this method are established. This directly leads to several novel sufficient conditions for guaranteeing the convergence of this parallel nonstationary multisplitting iteration method.

Zhong-Zhi Bai | Z. Bai

[1] A. Frommer,et al. Convergence of relaxed parallel multisplitting methods , 1989 .

[2] L. Elsner,et al. Models of parallel chaotic iteration methods , 1988 .

[3] R. Plemmons,et al. Convergence of parallel multisplitting iterative methods for M-matrices , 1987 .

[4] Zhong-Zhi Bai,et al. The monotone convergence of the two-stage iterative method for solving large sparse systems of linear equations , 1997 .

[5] Zhong-Zhi Bai,et al. A unified framework for the construction of various matrix multisplitting iterative methods for large sparse system of linear equations , 1996 .