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The Moore–Penrose inverse of particular bordered matrices

Part of: Basic linear algebra

Published online by Cambridge University Press:  09 April 2009

Frank J. Hall
Frank J. Hall*
Affiliation:
Department of MathematicsPembroke State UniversityPembroke, North Carolina 28372, U.S.A.
*
Author's current address: Department of Mathematics Georgia State University Atlanta, Georgia 30303 U.S.A.
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Abstract

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The Moore-Penrose inverse of a general bordered matrix is found under various conditions. The Moore-Penrose inverses obtained by Hall and Hartwig (1976) are shown to be special cases of these more general results.

MSC classification

Secondary: 15A09: Matrix inversion, generalized inverses 15A21: Canonical forms, reductions, classification
Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 27 , Issue 4 , June 1979 , pp. 467 - 478
Copyright
Copyright © Australian Mathematical Society 1979

References

Ben-Israel, A. and Greville, T. N. E. (1974), Generalized inverses: theory and applications (John Wiley, New York).Google Scholar
Burns, F., Carlson, D., Haynsworth, E. and Markham, T. L., (1974), ‘Generalized inverse formulas using the Schur complement’, SIAM J. Appl. Math. 26, 254259.CrossRefGoogle Scholar
Hall, F. J. and Hartwig, R. E. (1976), ‘Further results on generalized inverses of partitioned matrices’, SIAM J. Appl. Math. 30, 617624.CrossRefGoogle Scholar
Hartwig, R. E. (1976), ‘Block generalized inverses’, Arch. Rational Mech. Anal. 61, 197251.CrossRefGoogle Scholar
Hung, C. H. and Markham, T. L. (1975a), ‘The Moore–Penrose inverse of a partitioned matrix ’, Czechoslovak Math. J. 25, 354361.CrossRefGoogle Scholar
Hung, C. H. and Markham, T. L. (1975b), ‘The Moore–Penrose inverse of a partitioned matrix’, Linear Algebra and Appl. 11, 7386.CrossRefGoogle Scholar