- Series: Graduate Texts in Mathematics (Book 207)
- Paperback: 443 pages
- Publisher: Springer; 2001 edition (April 20, 2001)
- Language: English
- ISBN-10: 0387952209
- ISBN-13: 978-0387952208
- Product Dimensions: 6.1 x 1 x 9.2 inches
- Shipping Weight: 1.8 pounds (View shipping rates and policies)
- Average Customer Review: 6 customer reviews
- Amazon Best Sellers Rank: #674,773 in Books (See Top 100 in Books)
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Algebraic Graph Theory (Graduate Texts in Mathematics) 2001st Edition
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C. Godsil and G.F. Royle
Algebraic Graph Theory
"A welcome addition to the literature . . . beautifully written and wide-ranging in its coverage."―MATHEMATICAL REVIEWS
"An accessible introduction to the research literature and to important open questions in modern algebraic graph theory"―L'ENSEIGNEMENT MATHEMATIQUE
Top customer reviews
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The reader is very much given a choice as to how much detail s/he wants to absorb. One can have a brief glance at just the theorems and definitions, which are easy to find using the index, and are well-stated. Or, one can briefly glance at the text without going into too much detail but still get the big picture. Finally, even complete understanding can be achieved without taking up too much time.
I highly recommend this book for a first or second course in graph theory, to anyone looking to start research in graph theory, for teachers who wish to motivate their students to start research in graph theory, as a reference, or as a quick borrow to learn a concept or two, making this book very important for any library.
--The second part is about Matrix theory, interlacing, strongly regular graph, two graph, generalized line graph, etc it is the main part of the book.
--The third part is about cut, flows, Knots, etc.
This book can serve as a nice introduction to the subject of Graph theory.
--This book lacks some more example, for this see "distance regular graph".
--It is sketchy on chromatic polynomial, planar graph.
--The original book by Norman Biggs is shorter, smarter, nicer