Logarithmic combinatorial structures: a probabilistic approach
Richard Arratia
University of Southern California, USAA. D. Barbour
University of Zürich, SwitzerlandSimon Tavaré
University of Southern California, USA
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| Frontmatter, AcknowledgmentsDownload pp. i–vii | |
| ContentsDownload pp. ix–xi | |
| 0 | PrefaceDownload pp. 1–8 |
| 1 | Permutations and Primespp. 9–34 |
| 2 | Decomposable Combinatorial Structurespp. 35–64 |
| 3 | Probabilistic Preliminariespp. 65–75 |
| 4 | The Ewens Sampling Formula: Methodspp. 77–93 |
| 5 | The Ewens Sampling Formula: Asymptoticspp. 95–124 |
| 6 | Logarithmic Combinatorial Structurespp. 125–147 |
| 7 | General Settingpp. 149–170 |
| 8 | Consequencespp. 171–224 |
| 9 | A Stein Equationpp. 225–237 |
| 10 | Point Probabilitiespp. 239–265 |
| 11 | Distributional Comparisons with pp. 267–283 |
| 12 | Comparisons with : Point Probabilitiespp. 285–299 |
| 13 | Proofspp. 301–328 |
| 14 | Technical Complementspp. 329–338 |
| Referencespp. 339–352 | |
| Notation Indexpp. 353–354 | |
| Author Indexpp. 355–357 | |
| Subject Indexpp. 359–363 |