Title of article :
CG Versus MINRES: An Empirical Comparison
Author/Authors :
Fong, David Chin-Lung Stanford University - ICME, USA , Saunders, Michael Stanford University - Department of Management Science and Engineering, Systems Optimization Laboratory, USA
Abstract :
For iterative solution of symmetric systems Ax =b, the conjugate gradient method (CG) is commonly used when A is positive definite, while the minimum residual method (MINRES) is typically reserved for indefinite systems. We investigate the sequence of approximate solutions x k generated by each method and suggest that even if A is positive definite, MINRES may be preferable to CG if iterations are to be terminated early. In particular, we show for MINRES that the solution norms ║x k║ are monotonically increasing when A is positive definite (as was already known for CG), and the solution errors ║x * - x k║ are monotonically decreasing. We also show that the backward errors for the MINRES iterates x k are monotonically decreasing.
Keywords :
Conjugate gradient method (CG) , Conjugate residual method (CR) , Iterative method , Krylov subspace method , Linear equations , Minimum residual method (MINRES) , Sparse matrix , Trust , region method.
Journal title :
Sultan Qaboos University Journal for Science
Journal title :
Sultan Qaboos University Journal for Science
