随机组合结构中的再生

IF 1.3 Q2 STATISTICS & PROBABILITY Probability Surveys Pub Date : 2009-01-28 DOI:10.1214/10-PS163
A. Gnedin
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引用次数: 29

摘要

金曼的划分结构理论,通过自然抽样程序,将有限划分与假设的无限总体联系起来。这种分区的显式分布公式很少,最明显的例外是evens抽样公式,以及Pitman对它的双参数扩展。当一个人在分区中添加一个额外的结构,比如在区块集合上的线性顺序和再生属性,一些表示定理允许获得更精确的分布信息。在这些笔记中,我们概述了再生分区和组成理论的最新发展。特别地,我们讨论了有序和无序结构之间的联系,Ewens-Pitman划分的再生性质,以及分量数的渐近性。
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Regeneration in random combinatorial structures
Kingman’s theory of partition structures relates, via a natural sampling procedure, finite partitions to hypothetical infinite populations. Explicit formulas for distributions of such partitions are rare, the most notable exception being the Ewens sampling formula, and its two-parameter extension by Pitman. When one adds an extra structure to the partitions like a linear order on the set of blocks and regenerative properties, some representation theorems allow to get more precise information on the distribution. In these notes we survey recent developments of the theory of regenerative partitions and compositions. In particular, we discuss connection between ordered and unordered structures, regenerative properties of the Ewens-Pitman partitions, and asymptotics of the number of components.
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来源期刊
Probability Surveys
Probability Surveys STATISTICS & PROBABILITY-
CiteScore
4.70
自引率
0.00%
发文量
9
期刊最新文献
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