ryser herbert (11 Ergebnisse)

Hardcover. Zustand: Very Good. First Edition. First Edition, Second Printing (1965). Published by Mathematical Association of America, 1963. Octavo. Hardcover. Book is very good with previous owner name on flyleaf and shelf wear. No dust jacket.100% positive feedback. 30 day money back guarantee. NEXT DAY SHIPPING! Excellent customer service. Please email with any questions. All books packed carefully and ship with free delivery confirmation/tracking. All books come with free bookmarks. Ships from Sag Harbor, New York.

Zustand: Très bon. Ancien livre de bibliothèque avec équipements. Ammareal reverse jusqu'à 15% du prix net de cet article à des organisations caritatives. ENGLISH DESCRIPTION Book Condition: Used, Very good. Former library book. Ammareal gives back up to 15% of this item's net price to charity organizations.

Hardcover. Zustand: Fine. Zustand des Schutzumschlags: Good. 1st Edition. 154 Pp. Blue Cloth, Gilt. First Printing, This Title Last In List Facing Title Page. Fine, No Wear, In Original Glassine Dj Which Is Chipped And Torn At Edges.

HARDCOVER. Fourth printing. 154pp, small octavo. Number 14. cover wear, tight binding, clean throughout, Very Good-.

Hardcover. Zustand: Very Good. Zustand des Schutzumschlags: Missing. Black cloth covered boards with gold titles; minimal wear; 12mo - over 6 3/4" to 7 3/4" tall; no jacket. Previous owner's name on front pastedown; interior is clean and unmarked; 154 pages.

Zustand: New. In.

Ehem. Bibliotheksexemplar mit Signatur und Stempel. GUTER Zustand, ein paar Gebrauchsspuren. Ex-library with stamp and library-signature. GOOD condition, some traces of use. Sprache: Englisch Gewicht in Gramm: 990.

Cloth. Zustand: Very Good. Zustand des Schutzumschlags: Very Good. Reprint. Type: Book N.B. Small plain label to front paste down. Letter J stamped on title page. Corners of boards a little bumped. (MATHEMATICS).

Taschenbuch. Zustand: Neu. Druck auf Anfrage Neuware - Printed after ordering - This book, first published in 1991, is devoted to the exposition of combinatorial matrix theory. This subject concerns itself with the use of matrix theory and linear algebra in proving results in combinatorics (and vice versa), and with the intrinsic properties of matrices viewed as arrays of numbers rather than algebraic objects in themselves. There are chapters dealing with the many connections between matrices, graphs, digraphs and bipartite graphs. The basic theory of network flows is developed in order to obtain existence theorems for matrices with prescribed combinatorial properties and to obtain various matrix decomposition theorems. Other chapters cover the permanent of a matrix, and Latin squares. The final chapter deals with algebraic characterizations of combinatorial properties and the use of combinatorial arguments in proving classical algebraic theorems, including the Cayley-Hamilton Theorem and the Jordan Canonical Form. The book is sufficiently self-contained for use as a graduate course text, but complete enough for a standard reference work on the basic theory. Thus it will be an essential purchase for combinatorialists, matrix theorists, and those numerical analysts working in numerical linear algebra.

Zustand: New. In.

Buch. Zustand: Neu. Druck auf Anfrage Neuware - Printed after ordering - This book, first published in 1991, is devoted to the exposition of combinatorial matrix theory. This subject concerns itself with the use of matrix theory and linear algebra in proving results in combinatorics (and vice versa), and with the intrinsic properties of matrices viewed as arrays of numbers rather than algebraic objects in themselves. There are chapters dealing with the many connections between matrices, graphs, digraphs and bipartite graphs. The basic theory of network flows is developed in order to obtain existence theorems for matrices with prescribed combinatorial properties and to obtain various matrix decomposition theorems. Other chapters cover the permanent of a matrix, and Latin squares. The final chapter deals with algebraic characterizations of combinatorial properties and the use of combinatorial arguments in proving classical algebraic theorems, including the Cayley-Hamilton Theorem and the Jordan Canonical Form. The book is sufficiently self-contained for use as a graduate course text, but complete enough for a standard reference work on the basic theory. Thus it will be an essential purchase for combinatorialists, matrix theorists, and those numerical analysts working in numerical linear algebra.