On semi-convergence of a class of relaxation methods for singular saddle point problems

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摘要

Recently, a class of efficient relaxation iterative methods has been proposed to solve the nonsingular saddle point problems. In this paper, we further prove the semi-convergence of these methods when it is applied to solve the singular saddle point problems. The semi-convergence properties of the relaxation iteration methods are carefully analyzed, which show that the iterative sequence generated by the relaxation iterative methods converges to a solution of the singular saddle point problem under suitable restrictions on the involved iteration parameters. In addition, numerical experiments are used to show the feasibility and effectiveness of the relaxation iterative methods for solving singular saddle point problems.

论文关键词:Singular saddle point problems,MIAOR method,GSSOR and USSOR methods,GSOR method,Semi-convergence

论文评审过程:Received 26 December 2014, Revised 8 March 2015, Accepted 11 March 2015, Available online 11 April 2015.

论文官网地址:https://doi.org/10.1016/j.amc.2015.03.093