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Block Krylov-Schur method for large symmetric eigenvalue problems

13 years 10 months ago
Block Krylov-Schur method for large symmetric eigenvalue problems
Stewart's Krylov-Schur algorithm offers two advantages over Sorensen's implicitly restarted Arnoldi (IRA) algorithm. The first is ease of deflation of converged Ritz vectors, the second is the avoidance of the potential forward instability of the QR algorithm. In this paper we develop a block version of the Krylov-Schur algorithm for symmetric eigenproblems. Details of this block algorithm are discussed, including how to handle rank deficient cases and how to use varying block sizes. Numerical results on the efficiency of the block Krylov-Schur method are reported.
Yunkai Zhou, Yousef Saad
Added 14 Dec 2010
Updated 14 Dec 2010
Type Journal
Year 2008
Where NA
Authors Yunkai Zhou, Yousef Saad
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