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CORR
2010
Springer
2010
Springer
MINRES-QLP: a Krylov subspace method for indefinite or singular symmetric systems
Abstract. CG, SYMMLQ, and MINRES are Krylov subspace methods for solving large symmetric systems of linear equations. CG (the conjugate-gradient method) is reliable on positive-definite systems, while SYMMLQ and MINRES are designed for indefinite systems. When these methods are applied to an incompatible system (that is, a singular symmetric least-squares problem), CG could break down and SYMMLQ's solution could explode, while MINRES would give a least-squares solution but not necessarily the minimum-length solution (often called the pseudoinverse solution). This understanding motivates us to design a MINRES-like algorithm to compute minimum-length solutions to singular symmetric systems. MINRES uses QR factors of the tridiagonal matrix from the Lanczos process (where R is uppertridiagonal). Our algorithm uses a QLP decomposition (where rotations on the right reduce R to lower-tridiagonal form), and so we call it MINRES-QLP. On singular or nonsingular systems, MINRES-QLP can give ...
Real-time TrafficCORR 2010 | Education | Krylov Subspace Method | Solution | Systems |
| Added | 09 Dec 2010 |
| Updated | 09 Dec 2010 |
| Type | Journal |
| Year | 2010 |
| Where | CORR |
| Authors | Sou-Cheng T. Choi, Christopher C. Paige, Michael A. Saunders |
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