Analysis of iterative methods for saddle point problems: a unified approach
Open Access
- 14 May 2001
- journal article
- Published by American Mathematical Society (AMS) in Mathematics of Computation
- Vol. 71 (238) , 479-506
- https://doi.org/10.1090/s0025-5718-01-01324-2
Abstract
In this paper two classes of iterative methods for saddle point problems are considered: inexact Uzawa algorithms and a class of methods with symmetric preconditioners. In both cases the iteration matrix can be transformed to a symmetric matrix by block diagonal matrices, a simple but essential observation which allows one to estimate the convergence rate of both classes by studying associated eigenvalue problems. The obtained estimates apply for a wider range of situations and are partially sharper than the known estimates in literature. A few numerical tests are given which confirm the sharpness of the estimates.Keywords
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