Recursive self preconditioning method based on Schur complement for Toeplitz matrices (Q1944751)
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scientific article; zbMATH DE number 6149001
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Recursive self preconditioning method based on Schur complement for Toeplitz matrices |
scientific article; zbMATH DE number 6149001 |
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Recursive self preconditioning method based on Schur complement for Toeplitz matrices (English)
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27 March 2013
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To solve a linear system \(Tx =b\) with a Toeplitz matrix \(T\), this paper describes a recursive self preconditioning algorithm. It is based on repeated halving of the problem and uses the Schur complement and the Gohberg-Semencul matrix inversion formula for computing the generating vectors of \(T^{-1}\). The preconditioned matrices have eigenvalues clustering around 1 and the iterations converge very quickly. Stability is also studied, as are numerical results.
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linear system
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Toeplitz matrix
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Schur complement
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Gohberg-Semencul formula
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displacement rank representation
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recursive algorithm
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iterative method
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iterative refinement
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preconditioning
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matrix inversion
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stability
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numerical results
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