Generalized inverses of Hankel and Toeplitz mosaic matrices

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Abstract

Hankel and Toeplitz mosaic matrices are block matrices with Hankel or Toeplitz blocks, respectively. It is shown that Hankel and Toeplitz mosaic matrices possess reflexive generalized inverses which are Bezoutians. Furthermore the Bezoutian structure of the Moore-Penrose and group inverses is investigated. © 1995, All rights reserved.

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APA

Heinig, G. (1995). Generalized inverses of Hankel and Toeplitz mosaic matrices. Linear Algebra and Its Applications, 216, 43–59. https://doi.org/10.1016/0024-3795(93)00097-J

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