零类泊松用于罕见事件研究

Thomas M. Semkow
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引用次数: 0

摘要

我们提出了零计数探测器(ZCD)的统计理论,它在本文概述的条件下被定义为零类泊松。在物理学、健康物理学以及其他许多需要对事件进行计数的领域中,对罕见事件的研究经常会遇到 ZCD。我们发现在经典统计学中没有可接受的解决 ZCD 的方法,因此肯定了贝叶斯统计的必要性。我们研究了几种均匀先验和参考先验,并得出了贝叶斯后验、点估计和上限。结果表明,包含最多信息的最大熵先验导致了最小偏差和最低风险,使其成为所研究先验中最可接受和可接受度最高的先验。我们还研究了零膨胀泊松分布和负二叉分布在 ZCD 中的应用。使用贝叶斯边际化方法表明,在信息有限的情况下,这些分布会还原为泊松分布。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Zero-Class Poisson for Rare-Event Studies
We developed a statistical theory of zero-count-detector (ZCD), which is defined as a zero-class Poisson under conditions outlined in the paper. ZCD is often encountered in the studies of rare events in physics, health physics, and many other fields where counting of events occurs. We found no acceptable solution to ZCD in classical statistics and affirmed the need for the Bayesian statistics. Several uniform and reference priors were studied and we derived Bayesian posteriors, point estimates, and upper limits. It was showed that the maximum-entropy prior, containing the most information, resulted in the smallest bias and the lowest risk, making it the most admissible and acceptable among the priors studied. We also investigated application of zero-inflated Poisson and Negative-binomial distributions to ZCD. It was showed using Bayesian marginalization that, under limited information, these distributions reduce to the Poisson distribution.
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