Algebraic Graph Theory (Graduate Texts in Mathematics)



Algebraic Graph Theory (Graduate Texts in Mathematics)
Publisher: Springer; 1 edition (April 20, 2001) | ISBN: 0387952411 | Pages: 439 | File type: PDF | 15,47 mb

Algebraic graph theory is a fascinating subject concerned with the interplay between algebra and graph theory. Algebraic tools can be used to give surprising and elegant proofs of graph theoretic facts, and there are many interesting algebraic objects associated with graphs. The authors take an inclusive view of the subject, and present a wide range of topics. These range from standard classics, such as the characterization of line graphs by eigenvalues, to more unusual areas such as geometric embeddings of graphs and the study of graph homomorphisms. The authors' goal has been to present each topic in a self-contained fashion, presenting the main tools and ideas, with an emphasis on their use in understanding concrete examples. A substantial proportion of the book covers topics that have not appeared in book form before, and as such it provides an accessible introduction to the research literature and to important open questions in modern algebraic graph theory. This book is primarily aimed at graduate students and researchers in graph theory, combinatorics, or discrete mathematics in general. However, all the necessary graph theory is developed from scratch, so the only pre-requisite for reading it is a first course in linear algebra and a small amount of elementary group theory. It should be accessible to motivated upper-level undergraduates. Chris Godsil is a full professor in the Department of Combinatorics and Optimization at the University of Waterloo. His main research interests lie in the interactions between algebra and combinatorics, in particular the application of algebraic techniques to graphs, designs and codes. He has published more than 70 papers in these areas, is a founding editor of "The Journal of Algebraic Combinatorics" and is the author of the book "Algebraic Combinatorics". Gordon Royle teaches in the Department of Computer Science Software Engineering at the University of Western Australia. His main research interests lie in the application of computers to combinatorial problems, in particular the cataloguing, enumeration and investigation of graphs, designs and finite geometries. He has published more than 30 papers in graph theory, design theory and finite geometry.




Download:

http://depositfiles.com/files/ufk5n6ug0

http://letitbit.net/download/3182.c3a906cd54f5b7159c4ef2222/0387952411.rar.html

http://www.filesonic.com/file/26993485/0387952411.rar




[Fast Download] Algebraic Graph Theory (Graduate Texts in Mathematics)


Related eBooks:
Instructor's Solutions Manual to Calculus & Its Applications
Deterministic Network Calculus
An Accelerated Solution Method for Two-Stage Stochastic Models in Disaster Management
Canonical Problems in Scattering and Potential Theory Part 1: Canonical Structures in Potential Theo
Computational Aspects of General Equilibrium Theory: Refutable Theories of Value
Epidemics: Models and Data using R
What Are the Chances? (Math Concept Reader, grade 6)
Handbook of Uncertainty Quantification
Rubik's Cubic Compendium (Recreations in Mathematics)
Stochastic Processes in Science, Engineering and Finance
Computational Logic
Articulated Motion and Deformable Objects
Copyright Disclaimer:
This site does not store any files on its server. We only index and link to content provided by other sites. Please contact the content providers to delete copyright contents if any and email us, we'll remove relevant links or contents immediately.