AbstractIn this note, some errors in a recent article by Niki et al. [H. Niki, T. Kohno, M. Morimoto, The preconditioned Gauss–Seidel method faster than the SOR method, J. Comput. Appl. Math. 219 (2008) 59–71] are pointed out and a new proof for the corresponding result is presented
AbstractIn this paper we apply the AOR method to preconditioned linear systems different from those ...
Iterative methods for the solution of linear systems of equations – such as stationary, semi-iterati...
Iterative methods for the solution of linear systems of equations – such as stationary, semi-iterati...
AbstractIn this note recent comparison results for preconditioned Gauss–Seidel (GS) methods are disc...
AbstractIn recent years, a number of preconditioners have been applied to linear systems [A.D. Gunaw...
AbstractKotakemori et al. (2002) [2] have reported that the convergence rate of the iterative method...
AbstractIn this work, we point out that there are incorrect assertions in the article by Li-Ying Sun...
AbstractIn 1997, Kohno et al. [Toshiyuki Kohno, Hisashi Kotakemori, Hiroshi Niki, Improving the modi...
AbstractIn 1991, Gunawardena et al. (Linear Algebra Appl. 154–156 (1991) 123) have reported the modi...
AbstractLi et al. [Y.T. Li, C. Li, S. Wu, Improvements of preconditioned AOR iterative methods for L...
AbstractIn this paper we present some comparison theorems between two different modified Gauss–Seide...
AbstractLinear systems with M-matrices often occur in a wide variety of areas including scientific c...
AbstractIn 1997, Kohno et al. have reported numerically that the improving modified Gauss–Seidel met...
AbstractIn 2002, H. Kotakemori et al. proposed the modified Gauss–Seidel (MGS) method for solving th...
AbstractIn this paper, we present some comparison theorems on preconditioned iterative method for so...
AbstractIn this paper we apply the AOR method to preconditioned linear systems different from those ...
Iterative methods for the solution of linear systems of equations – such as stationary, semi-iterati...
Iterative methods for the solution of linear systems of equations – such as stationary, semi-iterati...
AbstractIn this note recent comparison results for preconditioned Gauss–Seidel (GS) methods are disc...
AbstractIn recent years, a number of preconditioners have been applied to linear systems [A.D. Gunaw...
AbstractKotakemori et al. (2002) [2] have reported that the convergence rate of the iterative method...
AbstractIn this work, we point out that there are incorrect assertions in the article by Li-Ying Sun...
AbstractIn 1997, Kohno et al. [Toshiyuki Kohno, Hisashi Kotakemori, Hiroshi Niki, Improving the modi...
AbstractIn 1991, Gunawardena et al. (Linear Algebra Appl. 154–156 (1991) 123) have reported the modi...
AbstractLi et al. [Y.T. Li, C. Li, S. Wu, Improvements of preconditioned AOR iterative methods for L...
AbstractIn this paper we present some comparison theorems between two different modified Gauss–Seide...
AbstractLinear systems with M-matrices often occur in a wide variety of areas including scientific c...
AbstractIn 1997, Kohno et al. have reported numerically that the improving modified Gauss–Seidel met...
AbstractIn 2002, H. Kotakemori et al. proposed the modified Gauss–Seidel (MGS) method for solving th...
AbstractIn this paper, we present some comparison theorems on preconditioned iterative method for so...
AbstractIn this paper we apply the AOR method to preconditioned linear systems different from those ...
Iterative methods for the solution of linear systems of equations – such as stationary, semi-iterati...
Iterative methods for the solution of linear systems of equations – such as stationary, semi-iterati...
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