Partially isometric matrices
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Th e complex, not necessaril y square matrix A is called a partial isometry if the vectors x and A x have the same Euclidean norm whenever x is in the orthogonal complement of the null space of A. The main result s of the paper give necessary and sufficient conditions for a matrix to be a partial isometry, for a partial isometry to be normal and for the product of two partial isometries to be a partial isometry. A factorization for an arbitrary matrix involving partial isometries is given. The concept of a ge neralized inverse is used in establishing the primary results .
[1] M. Pearl,et al. On EPr and normal Epr matrices , 1966 .
[2] C. Eckart,et al. A principal axis transformation for non-hermitian matrices , 1939 .
[3] On generalized inverses of matrices , 1966 .
[4] I. Erdelyi. On Partial Isometries in Finite-Dimensional Euclidean Spaces , 1966 .
[5] C. Desoer,et al. A Note on Pseudoinverses , 1963 .