Ying-Long Zheng scite author profile

Ying-Long Zheng

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64Citation Statements Given

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Soochow University

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A splitting preconditioner for saddle point problems

Cao

Jiang

Zheng

2011

Numer. Linear Algebra Appl.

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For large sparse systems of linear equations iterative techniques are attractive. In this paper, we study a splitting method for an important class of symmetric and indefinite system. Theoretical analyses show that this method converges to the unique solution of the system of linear equations for all t>0 (t is the parameter). Moreover, all the eigenvalues of the iteration matrix are real and nonnegative and the spectral radius of the iteration matrix is decreasing with respect to the parameter t. Besides, a preconditioning strategy based on the splitting of the symmetric and indefinite coefficient matrices is proposed. The eigensolution of the preconditioned matrix is described and an upper bound of the degree of the minimal polynomials for the preconditioned matrix is obtained. Numerical experiments of a model Stokes problem and a least-squares problem with linear constraints presented to illustrate the effectiveness of the method.

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A note on the positive stable block triangular preconditioner for generalized saddle point problems

Cao

Jiang

Zheng

2012

Applied Mathematics and Computation

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Ying-Long Zheng

A splitting preconditioner for saddle point problems

A note on the positive stable block triangular preconditioner for generalized saddle point problems

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