随机图
2003-10
世图
Bela Bollobas
498
无
The period since the publication of the first edition of this book has seen the theory of random graphs go from strength to strength. Indeed, its appearance happened to coincide with a watershed in the subject; the emergence in the subsequent few years of singnificant new ideas and tools, perhaps most noteably concentration methods, has had a major impact. It could be argued that the subject is now qualitatively different, insofar as results which would previously have been inaccessible are now regarded as routine. Several long standing issues have been resolved, including the value of the chromatic number of a random graph $G-{n,p}$, the existence of Hamilton cycles in random cubic graphs, and precise bounds on certain Ramsey numbers. It remains the case, though, that most of the material in the first edition of the book is vital for gaining an insight into the theory of random graphs.
Preface Notation 1 Probability Theoretic Preliminaries 1.1 Notation and Basic Facts 1.2 Some Basic Distributions 1.3 Normal Approximation 1.4 Inequalities 1.5 Convergence in Distribution 2 Models of Random Graphs 2.1 The Basic Models 2.2 Properties of Almost All Graphs 2.3 Large Subsets of Vertices 2.4 Random Regular Graphs 3 The Degree Sequence 3.1 The Distribution of an Element of the Degree Sequence 3.2 Almost Determined Degrees 3.3 The Shape of the Degree Sequence 3.4 Jumps and Repeated Values 3.5 Fast Algorithms for the Graph Isomorphism Problem 4 Small Subgraphs 4.1 Strictly Balanced Graphs 4.2 Arbitrary Subgraphs 4.3 Poisson Approximation5 The Evolution of Random Graphs-Spare Components 5.1 Trees of Given Sizes As Components 5.2 The Number of Vertices on Tree Components 5.3 The Largest Tree Components 5.4 Components Containing Cycles6 The Evolution of Random Graphs-the Giant Component 6.1 A Gap in the Sequence of Components 6.2 The Emergence of the Giant Component 6.3 Small Components after Time 6.4 Further Results 6.5 Two Applications7 Connectivity and Matchings 7.1 The Connectedness of Random Graphs 7.2 The k-Gonnectedness of Random Graphs 7.3 Matchings in Bipartite Graphs 7.4 Matchings in Random Craphs 7.5 Reliable Networks 7.6 Random Regular Graphs8 Long Paths and Cycles9 The Automorphism Group10 The Diameter11 Cliques,Independent Sets and Colouring12 Ramsey Theory13 Explicit Constructions14 Sequences,Matrices and Permutations15 Sorting Algorithms 16 Random Graphs of Small OrderReferencesIndex
无
内容不错,适合搞数学的看,自己看起来不太喜欢这种风格吧
有用 很不错