Preconditioned Galerkin and minimal residual methods for solving Sylvester equations
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摘要
This paper presents preconditioned Galerkin and minimal residual algorithms for the solution of Sylvester equations AX − XB = C. Given two good preconditioner matrices M and N for matrices A and B, respectively, we solve the Sylvester equations MAXN − MXBN = MCN. The algorithms use the Arnoldi process to generate orthonormal bases of certain Krylov subspaces and simultaneously reduce the order of Sylvester equations. Numerical experiments show that the solution of Sylvester equations can be obtained with high accuracy by using the preconditioned versions of Galerkin and minimal residual algorithms and this versions are more robust and more efficient than those without preconditioning.
论文关键词:Sylvester matrix equations,Preconditioning,Galerkin method,Minimal residual method,Krylov subspace
论文评审过程:Available online 8 May 2006.
论文官网地址:https://doi.org/10.1016/j.amc.2006.02.021