On nested infinite occupancy scheme in random environment

被引:0
作者
Alexander Gnedin
Alexander Iksanov
机构
[1] Queen Mary University of London,School of Mathematical Sciences
[2] Taras Shevchenko National University of Kyiv,Faculty of Computer Science and Cybernetics
来源
Probability Theory and Related Fields | 2020年 / 177卷
关键词
Bernoulli sieve; Ewens’ partition; Functional limit theorem; Infinite occupancy; Nested hierarchy; Primary 60F17; 60J80; Secondary 60C05;
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中图分类号
学科分类号
摘要
We consider an infinite balls-in-boxes occupancy scheme with boxes organised in nested hierarchy, and random probabilities of boxes defined in terms of iterated fragmentation of a unit mass. We obtain a multivariate functional limit theorem for the cumulative occupancy counts as the number of balls approaches infinity. In the case of fragmentation driven by a homogeneous residual allocation model our result generalises the functional central limit theorem for the block counts in Ewens’ and more general regenerative partitions.
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页码:855 / 890
页数:35
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