Key points are not available for this paper at this time.
We consider multigrid methods for symmetric positive definite linear systems. We present a new algebraic convergence analysis of two‐grid schemes with inexact solution of the coarse grid system. This analysis allows us to bound the convergence factor of such perturbed two‐grid schemes, assuming only a certain bound on the convergence factor for the unperturbed scheme (with exact solution of the coarse grid system). Applied to multigrid methods with the standard W‐cycle, this analysis shows that if the convergence factor of the (unperturbed) two‐grid method is uniformly bounded by <1/2, then the convergence factor of the multigrid method is uniformly bounded by / (1-). The analysis is purely algebraic and requires only that pre‐ and postsmoothing are applied in a symmetric way. It covers both geometric and algebraic multigrid methods, and the coarse grid matrix may be of any type (not necessarily Galerkin).
Yvan Notay (Mon,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: