Convergence Analysis for A Class of Iterative Methods for Solving Saddle Point Systems

Abstract

Convergence analysis of a nested iterative scheme proposed by Bank,Welfert and Yserentant (BWY) ([Numer. Math., 666: 645-666, 1990]) for solving saddle point system is presented. It is shown that this scheme converges under weaker conditions: the contraction rate for solving the (1,1) block matrix is bound by (5-1)/2. Similar convergence result is also obtained for a class of inexact Uzawa method with even weaker contraction bound 2/2. Preconditioned generalized minimal residual method using BWY method as a preconditioner is shown to converge with realistic assumptions.