LEADER 04326nam 2200613 450 001 9910141243703321 005 20170816115247.0 010 $a1-118-03271-3 010 $a1-118-03096-6 035 $a(CKB)2670000000128016 035 $a(EBL)694693 035 $a(OCoLC)761319793 035 $a(SSID)ssj0000597345 035 $a(PQKBManifestationID)11362556 035 $a(PQKBTitleCode)TC0000597345 035 $a(PQKBWorkID)10577672 035 $a(PQKB)10849474 035 $a(MiAaPQ)EBC694693 035 $a(PPN)197022111 035 $a(EXLCZ)992670000000128016 100 $a20160816h20002000 uy 0 101 0 $aeng 135 $aur|n|---||||| 181 $ctxt 182 $cc 183 $acr 200 10$aRandom graphs /$fSvante Janson, Tomasz Luczak, Andrzej Rucinski 210 1$aNew York, New York :$cJohn Wiley & Sons, Inc.,$d2000. 210 4$dİ2000 215 $a1 online resource (350 p.) 225 1 $aWiley-Interscience Series in Discrete Mathematics and Optimization 300 $a"A Wiley-Interscience Publication." 311 $a0-471-17541-2 320 $aIncludes bibliographical references and indexes. 327 $aRandom Graphs; Preface; Contents; 1 Preliminaries; 1.1 Models of random graphs; 1.2 Notes on notation and more; 1.3 Monotonicity; 1.4 Asymptotic equivalence; 1.5 Thresholds; 1.6 Sharp thresholds; 2 Exponentially Small Probabilities; 2.1 Independent summands; 2.2 Binomial random subsets; 2.3 Suen's inequality; 2.4 Martingales; 2.5 Talagrand's inequality; 2.6 The upper tail; 3 Small Subgraphs; 3.1 The containment problem; 3.2 Leading overlaps and the subgraph plot; 3.3 Subgraph count at the threshold; 3.4 The covering problem; 3.5 Disjoint copies; 3.6 Variations on the theme; 4 Matchings 327 $a4.1 Perfect matchings4.2 G-factors; 4.3 Two open problems; 5 The Phase Transition; 5.1 The evolution of the random graph; 5.2 The emergence of the giant component; 5.3 The emergence of the giant: A closer look; 5.4 The structure of the giant component; 5.5 Near the critical period; 5.6 Global properties and the symmetry rule; 5.7 Dynamic properties; 6 Asymptotic Distributions; 6.1 The method of moments; 6.2 Stein's method: The Poisson case; 6.3 Stein's method: The normal case; 6.4 Projections and decompositions; 6.5 Further methods; 7 The Chromatic Number; 7.1 The stability number 327 $a7.2 The chromatic number: A greedy approach7.3 The concentration of the chromatic number; 7.4 The chromatic number of dense random graphs; 7.5 The chromatic number of sparse random graphs; 7.6 Vertex partition properties; 8 Extremal and Ramsey Properties; 8.1 Heuristics and results; 8.2 Triangles: The first approach; 8.3 The Szemere?di Regularity Lemma; 8.4 A partition theorem for random graphs; 8.5 Triangles: An approach with perspective; 9 Random Regular Graphs; 9.1 The configuration model; 9.2 Small cycles; 9.3 Hamilton cycles; 9.4 Proofs; 9.5 Contiguity of random regular graphs 327 $a9.6 A brief course in contiguity10 Zero-One Laws; 10.1 Preliminaries; 10.2 Ehrenfeucht games and zero-one laws; 10.3 Filling gaps; 10.4 Sums of models; 10.5 Separability and the speed of convergence; References; Index of Notation; Index 330 $aA unified, modern treatment of the theory of random graphs-including recent results and techniquesSince its inception in the 1960s, the theory of random graphs has evolved into a dynamic branch of discrete mathematics. Yet despite the lively activity and important applications, the last comprehensive volume on the subject is Bollobas's well-known 1985 book. Poised to stimulate research for years to come, this new work covers developments of the last decade, providing a much-needed, modern overview of this fast-growing area of combinatorics. Written by three highly respected members of the 410 0$aWiley-Interscience series in discrete mathematics and optimization. 606 $aRandom graphs 615 0$aRandom graphs. 676 $a511.5 676 $a511/.5 700 $aJanson$b Svante$0736482 702 $a?uczak$b Tomasz$f1963- 702 $aRucin?ski$b Andrzej 801 0$bMiAaPQ 801 1$bMiAaPQ 801 2$bMiAaPQ 906 $aBOOK 912 $a9910141243703321 996 $aRandom graphs$91910732 997 $aUNINA