Affiliation:
1. ELTE Eötvös Loránd University Department of Applied Analysis and HUN‐REN–ELTE Numerical Analysis and Large Networks Research Group Budapest Hungary
2. Department of Analysis and Operations Research Budapest University of Technology and Economics Hungary
Abstract
AbstractThis paper studies the superlinear convergence of Krylov iterations under the streamline‐diffusion preconditioning operator for convection‐dominated elliptic problems. First, convergence results are given involving the diffusion parameter . Then the limiting case is studied on the operator level, and the convergence results are extended to this situation under some conditions, in spite of the lack of compactness of the perturbation operators. An explicit rate is also given.