Description |
1 online resource |
Contents |
INTRODUCTION TO GRAPH THEORY; Contents; Preface; Chapter 1Basic Definitions and Concepts; 1.1. Fundamentals; 1.2. Graph Modeling Applications; 1.3. Graph Representations; 1.4. Generalizations; 1.5. Basic Graph Classes; 1.6. Basic Graph Operations; 1.7. Basic Subgraphs; 1.8. Separation and Connectivity; Chapter 2Trees and Bipartite Graphs; 2.1. Trees and Cyclomatic Number; 2.2. Trees and Distance; 2.3. Minimum Spanning Tree; 2.4. Bipartite Graphs; Chapter 3Chordal Graphs; 3.1. Preliminary; 3.2. Separators and Simplicial Vertices; 3.3. Degrees; 3.4. Distances in Chordal Graphs |
|
3.5. Quasi-triangulated GraphsChapter 4Planar Graphs; 4.1. Plane and Planar Graphs; 4.2. Euler's Formula; 4.3. K5 and K3,3 Are not Planar Graphs; 4.4. Kuratowski's Theorem and Planarity Testing; 4.5. Plane Triangulations and Dual Graphs; Chapter 5Graph Coloring; 5.1. Preliminary; 5.2. Definitions and Examples; 5.3. Structure of Colorings; 5.4. Chromatic Polynomial; 5.5. Coloring Chordal Graphs; 5.6. Coloring Planar Graphs; 5.7. Perfect Graphs; 5.8. Edge Coloring and Vizing's Theorem; 5.9. Upper Chromatic Index; Chapter 6Graph Traversals and Flows; 6.1. Eulerian Graphs; 6.2. Hamiltonian Graphs |
|
6.3. Network FlowsChapter 7Appendix; 7.1. What Is Mathematical Induction; 7.2. Graph Theory Algorithms and Their Complexity; 7.3. Answers and Hints to Selected Exercises; 7.4. Glossary of Additional Concepts; References; Index |
Bibliography |
Includes bibliographical references and index |
Notes |
English |
|
Description based on print version record |
Subject |
Graph theory.
|
|
MATHEMATICS -- Graphic Methods.
|
|
Graph theory
|
Form |
Electronic book
|
LC no. |
2020688895 |
ISBN |
9781614701132 |
|
161470113X |
|