Poisson Counts, Square Root Transformation and Small Area Estimation: Square Root Transformation.

Sankhya. Series B (2008) Pub Date : 2022-01-01 Epub Date: 2021-10-11 DOI:10.1007/s13571-021-00269-8
Malay Ghosh, Tamal Ghosh, Masayo Y Hirose
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引用次数: 2

Abstract

The paper intends to serve two objectives. First, it revisits the celebrated Fay-Herriot model, but with homoscedastic known error variance. The motivation comes from an analysis of count data, in the present case, COVID-19 fatality for all counties in Florida. The Poisson model seems appropriate here, as is typical for rare events. An empirical Bayes (EB) approach is taken for estimation. However, unlike the conventional conjugate gamma or the log-normal prior for the Poisson mean, here we make a square root transformation of the original Poisson data, along with square root transformation of the corresponding mean. Proper back transformation is used to infer about the original Poisson means. The square root transformation makes the normal approximation of the transformed data more justifiable with added homoscedasticity. We obtain exact analytical formulas for the bias and mean squared error of the proposed EB estimators. In addition to illustrating our method with the COVID-19 example, we also evaluate performance of our procedure with simulated data as well.

Abstract Image

Abstract Image

泊松计数,平方根变换和小面积估计:平方根变换。
这篇论文有两个目的。首先,它重新审视了著名的Fay-Herriot模型,但具有均方差已知误差方差。其动机来自对计数数据的分析,在本例中,佛罗里达州所有县的COVID-19死亡人数。泊松模型在这里似乎是合适的,因为它是罕见事件的典型模型。采用经验贝叶斯(EB)方法进行估计。然而,与传统的共轭伽马或泊松均值的对数正态先验不同,这里我们对原始泊松数据进行了平方根变换,并对相应的均值进行了平方根变换。利用适当的反向变换对原泊松均值进行了推断。平方根变换增加了均方差,使变换后的数据的正态近似更加合理。我们得到了所提出的EB估计的偏差和均方误差的精确解析公式。除了用COVID-19示例说明我们的方法外,我们还用模拟数据评估了我们的程序的性能。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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