Imbedding Conditions for Hermitian and Normal Matrices

Ky Fan; Gordon Pall

doi:10.4153/CJM-1957-036-1

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Let A, B be two square matrices with complex coefficients, of respective orders n and m, where n ≥ m. We shall say that B is imbeddable in A if there exists a unitary matrix U of order n such that U*AU contains B a s a principal submatrix. In other words, B is said to be imbeddable in A if there exists a matrix V of type n × m such that V*V = IW (= the identity matrix of order m) and V*AV = B.

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