GENERALIZED INVERSES OF HANKEL AND TOEPLITZ MOSAIC MATRICES

Authors
HEINIG G
Citation
G. Heinig, GENERALIZED INVERSES OF HANKEL AND TOEPLITZ MOSAIC MATRICES, Linear algebra and its applications, 216, 1995, pp. 43-59
Citations number
22
Categorie Soggetti
Mathematics,Mathematics
Journal title
Linear algebra and its applicationsACNP
ISSN journal
00243795
Volume
216
Year of publication
1995
Pages
43 - 59
Database
ISI
SICI code
0024-3795(1995)216:<43:GIOHAT>2.0.ZU;2-S
Abstract
Hankel and Toeplitz mosaic matrices are block matrices with Hankel or Toeplitz blocks, respectively. It is shown that Hankel and Toeplitz mo saic matrices possess reflexive generalized inverses which are Bezouti ans. Furthermore the Bezoutian structure of the Moore-Penrose and grou p inverses is investigated.