Open AccessMGMRES: A generalization of GMRES for solving large sparse nonsymmetric linear systems
Author(s) -
Dean M. Young,
Jin Chen
Publication year - 1996
Publication title -
osti oai (u.s. department of energy office of scientific and technical information)
Language(s) - English
Resource type - Reports
DOI - 10.2172/409863
Subject(s) - generalized minimal residual method , invertible matrix , krylov subspace , linear system , mathematics , generalization , matrix (chemical analysis) , residual , combinatorics , pure mathematics , algorithm , mathematical analysis , chemistry , chromatography
This paper is concerned with the solution of the linear system Au = b, where A is a real square nonsingular matrix which is large, sparse and nonsymmetric. We consider the use of Krylov subspace methods. We first choose an initial approximation u{sup (0)} to the solution {bar u} = A{sup -1}b. The GMRES (Generalized Minimum Residual Algorithm for Solving Non Symmetric Linear Systems) method was developed by Saad and Schultz (1986) and used extensively for many years, for sparse systems. This paper considers a generalization of GMRES; it is similar to GMRES except that we let Z = A{sup T}Y, where Y is a nonsingular matrix which is symmetric but not necessarily SPD
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