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Necessary and sufficient conditions for unitary similarity

Published online by Cambridge University Press:  09 April 2009

N. A. Wiegmann
N. A. Wiegmann
Affiliation:
George Washington University, Washington, D. C.
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If A and B are two complex matrices and if U is a complex unitary matrix such that UAUCT = B (where UCT denotes the conjugate transpose of U), then A and B are said to be unitarily similar. Necessary and sufficient conditions that two matrices be unitarily similar have been dealt with in [5] (from the point of view of group representation theory) and in [2] (from the point of view of developing a canonical form under unitary similarity).

Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 2 , Issue 1 , April 1961 , pp. 122 - 126
Copyright
Copyright © Australian Mathematical Society 1961

References

[1]Albert, A., On the Orthogonal Equivalence of Sets of Real Symmetric Matrices, J. Math. and Mech., Vol. 7, (1958), pp. 219235.Google Scholar
[2]Brenner, J., The Problem of Unitary Equivalence, Acta Math., Vol. 86 (1951), pp. 297308.CrossRefGoogle Scholar
[3]Lee, H. C., Eigenvalues and Canonical Forms of Matrices with Quaternion Coefficients, Proc. Roy. Irish Acad. Sect. A, Vol. 52 (1949), pp. 253260.Google Scholar
[4]Specht, W., Zur Theorie der Gruppen linearer Substitutionen, II, Jber. Deutschen Math. Verein., Vol. 49 (1939), pp. 207215.Google Scholar
[5]Specht, W., Zur Theorie der Matrizen, II. Jber. Deutschen Math. Verein., Vol. 50 (1940), pp. 1923.Google Scholar
[6]Wiegmann, N., Some Theorems on Matrices with Real Quaternion Elements, Canad. J. Math., Vol. 7 (1955), pp. 191201.CrossRefGoogle Scholar
[7]Wiegmann, N., The Structure of Unitary and Orthogonal Quaternion Matrices, III. J. Math., 2 (1958) pp. 402407.Google Scholar