DocumentCode
2379841
Title
Computing the Jordan canonical form in finite precision arithmetic
Author
Suzuki, Takumi ; Suzuki, Takumi
Author_Institution
Univ. of Yamanashi, Kofu
fYear
2006
fDate
26-29 Sept. 2006
Firstpage
39
Lastpage
39
Abstract
The authors propose a criterion how to decide a cluster of eigenvalues to be a multiple eigenvalue or nearly multiple eigenvalues in finite precision arithmetic. If the matrix has a multiple eigenvalue, the eigenvector and the generalized ones are computed by their method, and therefore the Jordan canonical form can be derived. Results of numerical experiments for several kinds of matrices are shown.
Keywords
eigenvalues and eigenfunctions; matrix algebra; Jordan canonical form; eigenvalues cluster; finite precision arithmetic; multiple eigenvalue; Arithmetic; Eigenvalues and eigenfunctions; Humans; Information processing; Matrix decomposition; Singular value decomposition; Symmetric matrices;
fLanguage
English
Publisher
ieee
Conference_Titel
Scientific Computing, Computer Arithmetic and Validated Numerics, 2006. SCAN 2006. 12th GAMM - IMACS International Symposium on
Conference_Location
Duisburg
Print_ISBN
978-0-7695-2821-2
Type
conf
DOI
10.1109/SCAN.2006.13
Filename
4402429
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