Chromatic Graph Theory / Edition 1

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ISBN-10:: 1138343862
ISBN-13:: 9781138343863
Pub. Date:: 11/26/2019
Publisher:: Taylor & Francis

ISBN-10:: 1138343862
ISBN-13:: 9781138343863
Pub. Date:: 11/26/2019
Publisher:: Taylor & Francis

Chromatic Graph Theory / Edition 1

Hardcover

$160.0

Overview

With Chromatic Graph Theory, Second Edition, the authors present various fundamentals of graph theory that lie outside of graph colorings, including basic terminology and results, trees and connectivity, Eulerian and Hamiltonian graphs, matchings and factorizations, and graph embeddings. Readers will see that the authors accomplished the primary goal of this textbook, which is to introduce graph theory with a coloring theme and to look at graph colorings in various ways.

The textbook also covers vertex colorings and bounds for the chromatic number, vertex colorings of graphs embedded on surfaces, and a variety of restricted vertex colorings. The authors also describe edge colorings, monochromatic and rainbow edge colorings, complete vertex colorings, several distinguishing vertex and edge colorings.

Features of the Second Edition:

The book can be used for a first course in graph theory as well as a graduate course
The primary topic in the book is graph coloring
The book begins with an introduction to graph theory so assumes no previous course
The authors are the most widely-published team on graph theory
Many new examples and exercises enhance the new edition

Product Details

ISBN-13:	9781138343863
Publisher:	Taylor & Francis
Publication date:	11/26/2019
Series:	Textbooks in Mathematics
Pages:	525
Product dimensions:	6.12(w) x 9.19(h) x (d)

About the Author

Gary Chartrand is a professor emeritus of mathematics at Western Michigan University.

Ping Zhang is a professor of mathematics at Western Michigan University.

The two have authored or co-authored many textbooks in mathematics and numerous research articles in graph theory. The authors publish several books on graph theory, including the best-selling Graphs and Diagraphs, Sixth Edition, CRC Press, the most widely-used introductory text for course in graph theory.

0 The Origin of Graph Colorings 1

1 Introduction to Graphs 27

1.1 Fundamental Terminology 27

1.2 Connected Graphs 30

1.3 Distance in Graphs 33

1.4 Isomorphic Graphs 37

1.5 Common Graphs and Graph Operations 39

1.6 Multigraphs and Digraphs 44

Exercises for Chapter 1 47

2 Trees and Connectivity 53

2.1 Cut-vertices, Bridges, and Blocks 53

2.2 Trees 56

2.3 Connectivity and Edge-Connectivity 59

2.4 Menger's Theorem 63

Exercises for Chapter 2 67

3 Eulerian and Hamiltonian Graphs 71

3.1 Eulerian Graphs 71

3.2 de Bruijn Digraphs 76

3.3 Hamiltonian Graphs 79

Exercises for Chapter 3 87

4 Matchings and Factorization 91

4.1 Matchings 91

4.2 Independence in Graphs 98

4.3 Factors and Factorization 100

Exercises for Chapter 4 106

5 Graph Embeddings 109

5.1 Planar Graphs and the Euler Identity 109

5.2 Hamiltonian Planar Graphs 118

5.3 Planarity Versus Nonplanarity 120

5.4 Embedding Graphs on Surfaces 131

5.5 The Graph Minor Theorem 139

Exercises for Chapter 5 141

6 Introduction to Vertex Colorings 147

6.1 The Chromatic Number of a Graph 147

6.2 Applications of Colorings 153

6.3 Perfect Graphs 160

Exercises for Chapter 6 170

7 Bounds for the Chromatic Number 175

7.1 Color-Critical Graphs 175

7.2 Upper Bounds and Greedy Colorings 179

7.3 Upper Bounds and Oriented Graphs 189

7.4 The Chromatic Number of Cartesian Products 195

Exercises for Chapter 7 200

8 Coloring Graphs on Surfaces 205

8.1 The Four Color Problem 205

8.2 The Conjectures of Hajos and Hadwiger 208

8.3 Chromatic Polynomials 211

8.4 The Heawood Map-Coloring Problem 217

Exercises for Chapter 8 219

9 Restricted Vertex Colorings 223

9.1 UniquelyColorable Graphs 223

9.2 List Colorings 230

9.3 Precoloring Extensions of Graphs 240

Exercises for Chapter 9 245

10 Edge Colorings of Graphs 249

10.1 The Chromatic Index and Vizing's Theorem 249

10.2 Class One and Class Two Graphs 255

10.3 Tait Colorings 262

10.4 Nowhere-Zero Flows 269

10.5 List Edge Colorings 279

10.6 Total Colorings of Graphs 282

Exercises for Chapter 10 284

11 Monochromatic and Rainbow Colorings 289

11.1 Ramsey Numbers 289

11.2 Turan's Theorem 296

11.3 Rainbow Ramsey Numbers 299

11.4 Rainbow Numbers of Graphs 306

11.5 Rainbow-Connected Graphs 314

11.6 The Road Coloring Problem 320

Exercises for Chapter 11 324

12 Complete Colorings 329

12.1 The Achromatic Number of a Graph 329

12.2 Graph Homomorphisms 335

12.3 The Grundy Number of a Graph 349

Exercises for Chapter 12 356

13 Distinguishing Colorings 359

13.1 Edge-Distinguishing Vertex Colorings 359

13.2 Vertex-Distinguishing Edge Colorings 370

13.3 Vertex-Distinguishing Vertex Colorings 379

13.4 Neighbor-Distinguishing Edge Colorings 385

Exercises for Chapter 13 391

14 Colorings, Distance, and Domination 397

14.1 T-Colorings 397

14.2 L(2, 1)-Colorings 403

14.3 Radio Colorings 410

14.4 Hamiltonian Colorings 417

14.5 Domination and Colorings 425

14.6 Epilogue 434

Exercises for Chapter 14 434

Appendix Study Projects 439

General References 446

Bibliography 453

Index (Names and Mathematical Terms) 465

List of Symbols 480

What People are Saying About This

From the Publisher

… The book is written in a student-friendly style with carefully explained proofs and examples and contains many exercises of varying difficulty. … The book is intended for standard courses in graph theory, reading courses and seminars on graph colourings, and as a reference book for individuals interested in graphs colourings.
—Zentralblatt MATH 1169

… well-conceived and well-written book … written in a reader-friendly style, and there is a sufficient number of exercises at the end of each chapter.
—Miklós Bóna, University of Florida, MAA Online, January 2009

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Editorial Reviews

… The book is written in a student-friendly style with carefully explained proofs and examples and contains many exercises of varying difficulty. … The book is intended for standard courses in graph theory, reading courses and seminars on graph colourings, and as a reference book for individuals interested in graphs colourings.
—Zentralblatt MATH 1169

… well-conceived and well-written book … written in a reader-friendly style, and there is a sufficient number of exercises at the end of each chapter.
—Miklós Bóna, University of Florida, MAA Online, January 2009
… The book is written in a student-friendly style with carefully explained proofs and examples and contains many exercises of varying difficulty. … The book is intended for standard courses in graph theory, reading courses and seminars on graph colourings, and as a reference book for individuals interested in graphs colourings.
—Zentralblatt MATH 1169
… well-conceived and well-written book … written in a reader-friendly style, and there is a sufficient number of exercises at the end of each chapter.
—Miklós Bóna, University of Florida, MAA Online, January 2009

From the Publisher

Chromatic Graph Theory / Edition 1

Chromatic Graph Theory / Edition 1

Hardcover

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