Chapter
Structured Matrices and Their Generalized Inverses
Abstract
A matrix is considered structured if its structure can be exploited to obtain efficient algorithms. Examples of structured matrices include Toeplitz, Hankel, circulant, Vandermonde, Cauchy, sparse. A matrix is called Toeplitz if its entries on the same diagonal are equal.
Authors
Wang G; Wei Y; Qiao S
Book title
Developments in Mathematics
Volume
53
Pagination
pp. 225-231
Publication Date
January 1, 2018
DOI
10.1007/978-981-13-0146-9_6