Title :
On convergence bounds of GMRES algorithm
Author_Institution :
Inst. of Comput. Applications, CAEP, China
Abstract :
We first make a brief review of GMRES convergence results. Then we derive new bounds for the GMRES residual norm by making use of a unitary matrix U and a Hermitian positive definite matrix P, which are GMRES-equivalent to the coefficient matrix A with respect to the initial residual r0. The existence of such U and P was proved by Leonid (2000). As a GMRES residual norm bound for linear systems with Hermitian positive definite coefficient matrices is known and a GMRES residual norm bound for linear systems with unitary coefficient matrices can be readily derived from Liesen´s (2000) work, our new bounds follow from the fact that two GMRES-equivalent matrices make the same residual.
Keywords :
Hermitian matrices; computational complexity; convergence of numerical methods; iterative methods; GMRES algorithm; GMRES residual norm; GMRES-equivalent matrices; Hermitian positive definite coefficient matrix; convergence bounds; iterative method; linear equation systems; unitary matrix; Character generation; Computer applications; Convergence; Costs; Equations; Iterative algorithms; Iterative methods; Linear systems; Polynomials; Vectors;
Conference_Titel :
Parallel and Distributed Computing, Applications and Technologies, 2003. PDCAT'2003. Proceedings of the Fourth International Conference on
Print_ISBN :
0-7803-7840-7
DOI :
10.1109/PDCAT.2003.1236406
