A polynomial birth-death point process approximation to the Bernoulli process

被引：4

作者：

Xia, Aihua ^{[1
]}

Zhang, Fuxi ^{[1
]}

机构：

[1] Univ Melbourne, Dept Math & Stat, Melbourne, Vic 3010, Australia

来源：

STOCHASTIC PROCESSES AND THEIR APPLICATIONS | 2008年 / 118卷 / 07期

关键词：

Poisson process approximation; polynomial birth-death distribution; Wasserstein distance; total variation distance;

D O I：

10.1016/j.spa.2007.08.002

中图分类号：

O21 [概率论与数理统计]; C8 [统计学];

学科分类号：

020208 ; 070103 ; 0714 ;

摘要：

We propose a class of polynomial birth-death point processes (abbreviated to PBDP) Z:=Sigma(Z)(i=1)delta(Ui), where Z is a polynomial birth-death random variable defined in [T.C. Brown, A. Xia, Stein's method and birth-death processes, Ann. Probab. 29 (2001) 1373-1403], U-i's are independent and identically distributed random elements on a compact metric space, and U-i's are independent of Z. We show that, with two appropriately chosen parameters, the error of PBDP approximation to a Bernoulli process is of the order O(n(-1/2)) with n being the number of trials in the Bernoulli process. Our result improves the performance of Poisson process approximation, where the accuracy is mainly determined by the rarity (i.e. the success probability) of the Bernoulli trials and the dependence on sample size n is often not explicit in the bound. (C) 2007 Elsevier B.V. All rights reserved.

引用

页码：1254 / 1263

页数：10

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