A weakly stable algorithm for general Toeplitz systems

A. Griewank; A.N. Kolmogorov; A.W. Bojanczyk; A.W. Bojanczyk; A.W. Bojanczyk; A.W. Bojanczyk; A.W. Bojanczyk; Adam W. Bojanczyk; B.R. Musicus; C.-T. Pan; C.C. Paige; C.H. Bischof; D.J. Higham; D.R. Sweet; D.R. Sweet; D.R. Sweet; E.H. Bareiss; F.R. Hoog de; F.T. Luk; Frank R. de Hoog; G. Cybenko; G. Cybenko; G. Heinig; G. Heinig; G. Szegö; G.A. Watson; G.H. Golub; G.H. Golub; G.H. Golub; G.S. Ammar; G.W. Stewart; G.W. Stewart; G.W. Stewart; H. Sexton; I. Schur; J. Chun; J. Chun; J. Dongarra; J. Jankowski; J. Rissanen; J.G. Nagy; J.H. Wilkinson; J.H. Wilkinson; J.H. Wilkinson; J.M. Varah; J.R. Bunch; J.R. Bunch; M. Gentleman; M.A. Saunders; M.H. Gutknecht; M.H. Gutknecht; M.H. Gutknecht; N. Gould; N. Levinson; N. Wiener; P.C. Hansen; P.E. Gill; R. Fletcher; R.D. Skeel; R.P. Brent; R.P. Brent; R.R. Bitmead; R.W. Freund; R.W. Freund; R.W. Freund; Richard P. Brent; S. Qiao; S. Zohar; T. Kailath; T. Kailath; T. Kailath; T. Kailath; T.F. Chan; T.F. Chan; W. Miller; W.F. Trench; Å. Björck

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A weakly stable algorithm for general Toeplitz systems

Authors: A. Griewank
A.N. Kolmogorov
A.W. Bojanczyk
A.W. Bojanczyk
A.W. Bojanczyk
A.W. Bojanczyk
A.W. Bojanczyk
Adam W. Bojanczyk
B.R. Musicus
C.-T. Pan
C.C. Paige
C.H. Bischof
D.J. Higham
D.R. Sweet
D.R. Sweet
D.R. Sweet
E.H. Bareiss
F.R. Hoog de
F.T. Luk
Frank R. de Hoog
G. Cybenko
G. Cybenko
G. Heinig
G. Heinig
G. Szegö
G.A. Watson
G.H. Golub
G.H. Golub
G.H. Golub
G.S. Ammar
G.W. Stewart
G.W. Stewart
G.W. Stewart
H. Sexton
I. Schur
J. Chun
J. Chun
J. Dongarra
J. Jankowski
J. Rissanen
J.G. Nagy
J.H. Wilkinson
J.H. Wilkinson
J.H. Wilkinson
J.M. Varah
J.R. Bunch
J.R. Bunch
M. Gentleman
M.A. Saunders
M.H. Gutknecht
M.H. Gutknecht
M.H. Gutknecht
N. Gould
N. Levinson
N. Wiener
P.C. Hansen
P.E. Gill
R. Fletcher
R.D. Skeel
R.P. Brent
R.P. Brent
R.R. Bitmead
R.W. Freund
R.W. Freund
R.W. Freund
Richard P. Brent
S. Qiao
S. Zohar
T. Kailath
T. Kailath
T. Kailath
T. Kailath
T.F. Chan
T.F. Chan
W. Miller
W.F. Trench
Å. Björck
Publication date: 1 January 1995
Publisher: 'Springer Science and Business Media LLC'
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Abstract

We show that a fast algorithm for the QR factorization of a Toeplitz or Hankel matrix A is weakly stable in the sense that R^T.R is close to A^T.A. Thus, when the algorithm is used to solve the semi-normal equations R^T.Rx = A^Tb, we obtain a weakly stable method for the solution of a nonsingular Toeplitz or Hankel linear system Ax = b. The algorithm also applies to the solution of the full-rank Toeplitz or Hankel least squares problem.Comment: 17 pages. An old Technical Report with postscript added. For further details, see http://wwwmaths.anu.edu.au/~brent/pub/pub143.htm

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