Bounds for extreme singular values of a complex matrix and its applications

Autor:	Ayşe Dilek Güngör, Ramazan Türkmen
Rok vydání:	2006
Předmět:	Complex matrix Applied Mathematics General Mathematics Hilbert matrix Combinatorics Matrix (mathematics) Singular value symbols.namesake Square root Singular solution Hadamard transform symbols Order (group theory) Mathematics
Zdroj:	Mathematical Inequalities & Applications. :23-31
ISSN:	1331-4343
DOI:	10.7153/mia-09-03
Popis:	In this study, we have obtained bounds for extreme singular values of a complex matrix A of order n × n . In addition, we have found a bounds for the extreme singular values of Hilbert matrix, its Hadamard square root, Cauchy-Toeplitz matrix, Cauchy-Hankel matrix in the forms H = (1(i + j − 1))i,j=1 , H◦1/2 = (1 (i + j − 1))i,j=1, Tn = [1(g + (i − j)h)]i,j=1 and Hn = [1(g + (i + j)h)]i,j=1
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_________::4a51eb116212f8f07ff0394c99e0d724 https://doi.org/10.7153/mia-09-03 Zobrazit plný text záznamu