A modified generalized shift-splitting preconditioner for nonsymmetric saddle point problems

Abstract: For the nonsymmetric saddle point problems with nonsymmetric positive definite (1,1) parts, the modified generalized shift-splitting (MGSSP) preconditioner as well as the MGSSP iteration method are derived in this paper, which generalize the MSSP preconditioner and the MSSP iteration method newly developed by Huang and Su (J. Comput. Appl. Math. 2017), respectively. The convergent and semi-convergent analysis of the MGSSP iteration method are presented, and we prove that this method is unconditionally converge… Show more

“…As a matter of fact, by taking k = 1 in (18) and (19), we can see that ω opt = τ opt , the optimal parameter is reduced to the single ω opt = 1 ± ( 1 + µ 2 min − 1)/µ min as mentioned in Ref. 19.…”

“…In recent years, a variety of iterative techniques are investigated to solve all kinds of linear systems including the complex situation [1][2][3][4][5][6][7][8][9][10][11][12][13][14][21][22][23] , such as saddle-point problem and various generalized forms 16,18,26 . In particular, the SOR, SSOR iterative schemes and their variants are presented for solving some large and sparse linear systems 17 .…”

A modified SSOR iterative method for a class of block two-by-two linear systems

“…As a matter of fact, by taking k = 1 in (18) and (19), we can see that ω opt = τ opt , the optimal parameter is reduced to the single ω opt = 1 ± ( 1 + µ 2 min − 1)/µ min as mentioned in Ref. 19.…”

“…In recent years, a variety of iterative techniques are investigated to solve all kinds of linear systems including the complex situation [1][2][3][4][5][6][7][8][9][10][11][12][13][14][21][22][23] , such as saddle-point problem and various generalized forms 16,18,26 . In particular, the SOR, SSOR iterative schemes and their variants are presented for solving some large and sparse linear systems 17 .…”

A modified SSOR iterative method for a class of block two-by-two linear systems

“…Based on Lemma 2, the inequalities ( 20) and (21) imply that the roots of the real quadratic equation (19) satisfy |λ| < 1. If t = 0, then Eq.…”

“…On the other hand, combining the shift splitting technique with the matrix splitting technique, some new efficient preconditioners have been developed, such as the modified shiftsplitting preconditioner [34], the generalized modified shift-splitting preconditioner [22], the extended shift-splitting preconditioner [35], a general class of shift-splitting preconditioner [10], the modified generalized shift-splitting preconditioner [21,32], the generalized double shift-splitting preconditioner [16], and so on.…”

A shift-splitting preconditioner for asymmetric saddle point problems

“…Based on the work in Chen and Ma (2015), use the two-parameter shift-splitting preconditioner for the saddle point problems (3) with symmetric positive semidefinite (2, 2)-block, and for the same problem when the symmetry of the (1,1)-block is omitted in , Cao et al (2015) considered the saddle point problems (3) with nonsymmetric positive definite (1, 1)block, Cao and Miao (2016) considered the singular nonsymmetric saddle point problems (3), and so on. On the other hand, combining the shift splitting technique with the matrix splitting technique, some new efficient preconditioners have been developed, such as the modified shift-splitting preconditioner (Zhou et al 2016), the generalized modified shift-splitting preconditioner (Huang et al 2017), the extended shift-splitting preconditioner (Zheng and Lu 2017), a general class of shift-splitting preconditioner (Cao 2019), the modified generalized shift-splitting preconditioner (Huang et al 2018;Salkuyeh and Rahimian 2017), the generalized double shift-splitting preconditioner (Fan et al 2018), and so on.…”

A shift-splitting preconditioner for asymmetric saddle point problems