Algorithm 253: [F2]: Eigenvalues of real symmetric matrix by the QR method

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Algorithm 253: [F2]: Eigenvalues of real symmetric matrix by the QR method

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Communications of the ACM archive
Volume 8 , Issue 4 (April 1965) table of contents

Pages: 217 - 218

Year of Publication: 1965

ISSN:0001-0782

Author

P. A. Businger

Univ. of Texas, Austin

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 9, Downloads (12 Months): 37, Citation Count: 2

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REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

	1	FRANCIS, J. G. F. The QR transformation-Part 2. Comput. J. 4 (1961), 332-345.
	2	ORTEGA, J. M., AND KAISER, H. F. The LL T and QR methods for symmetric tridiagonal matrices. Comput. J. 6 (1963), 99-101.
	3	PARLETT, B. The development and use of methods of LR type. New York U., 1963.
	4	WILKINSON, J. H. Householder's method for symmetric matrices, Numer. Math. 4, (1962), 354-361.
	5	FRANCIS, J. G. F. The QR transformation-Part 2. Comput. J. 4 (1961), 332-345.
	6	PARLETT, B. The development and use of methods of LR type. New York U., 1963.
	7	WILKINSON, J. H. Householder's method for symmetric matrices. Numer. Math. 4 (1962), 354-361.

CITED BY 2

	Webb Miller, Software for Roundoff Analysis, ACM Transactions on Mathematical Software (TOMS), v.1 n.2, p.108-128, June 1975
	Cleve B. Moler, State of the art in matrix computations, ACM SIGNUM Newsletter, v.4 n.1, p.22-28, January 1969