Totally positive matrices / Allan Pinkus.

Show other versions (2)

"Totally positive matrices constitute a particular class of matrices, the study of which was initiated by analysts because of its many applications in diverse areas. This modern account of the subject is comprehensive and thorough, with careful treatment of the central properties of totally positive...

Full description

Bibliographic Details
Uniform Title:	Cambridge tracts in mathematics ; 181.
Main Author:	Pinkus, Allan, 1946-
Language:	English
Published:	New York : Cambridge University Press, 2010.
Series:	Cambridge tracts in mathematics ; 181.
Subjects:	Matrices.
Physical Description:	xi, 182 pages ; 23 cm.
Format:	Book

MARC


LEADER	00000nam a22000008a 4500
001	in00004570373
003	OCoLC
005	20220616124908.0
008	090901s2010 nyu 000 0 eng
010			\|a 2009036647
020			\|a 9780521194082 (hardback)
035			\|a (CaEvSKY)sky120951900
035			\|a (OCoLC)444107065
040			\|a DLC \|c DLC \|d UtOrBLW
049			\|a EEMO
050	0	0	\|a QA188 \|b .P556 2010
082	0	0	\|a 512.9/434 \|2 22
090			\|a QA1 \|b .C27 no.181
100	1		\|a Pinkus, Allan, \|d 1946- \|0 http://id.loc.gov/authorities/names/n84100337
245	1	0	\|a Totally positive matrices / \|c Allan Pinkus.
260			\|a New York : \|b Cambridge University Press, \|c 2010.
263			\|a 0912.
300			\|a xi, 182 pages ; \|c 23 cm.
336			\|a text \|b txt \|2 rdacontent
337			\|a unmediated \|b n \|2 rdamedia
338			\|a volume \|b nc \|2 rdacarrier
490	1		\|a Cambridge tracts in mathematics ; \|v 181
505	8		\|a Machine generated contents note: Foreword; 1. Basic properties of totally positive matrices; 2. Criteria for total positivity and strict total positivity; 3. Variation diminishing; 4. Examples; 5. Eigenvalues and eigenvectors; 6. Factorizations of totally positive matrices; Afterword; References; Subject index; Author index.
520			\|a "Totally positive matrices constitute a particular class of matrices, the study of which was initiated by analysts because of its many applications in diverse areas. This modern account of the subject is comprehensive and thorough, with careful treatment of the central properties of totally positive matrices, full proofs and a complete bibliography. The history of the subject is also described: in particular, the book ends with a tribute to the four people who have made the most notable contributions to the history of total positivity: I. J. Schoenberg, M. G. Krein, F. R. Gantmacher and S. Karlin. This monograph will appeal to those with an interest in matrix theory, to those who use or have used total positivity, and to anyone who wishes to learn about this rich and interesting subject"--Provided by publisher.
650		0	\|a Matrices. \|0 http://id.loc.gov/authorities/subjects/sh85082210
830		0	\|a Cambridge tracts in mathematics ; \|v 181. \|0 http://id.loc.gov/authorities/names/n42005726
907			\|y .b7140398x \|b 170922 \|c 100122
998			\|a rs \|b 100122 \|c m \|d a \|e - \|f eng \|g nyu \|h 0 \|i 2
999	f	f	\|i efbe0972-41d1-5d8a-8919-857a7c4c2311 \|s 1558a69a-aebe-5ff3-b2de-55057d9f4fd3 \|t 0
952	f	f	\|a Michigan State University-Library of Michigan \|b Michigan State University \|c MSU Remote Storage \|d MSU Remote Storage \|t 0 \|e QA1 .C27 no.181