泊松大小偏置抽样中的稀疏指数:小样本无偏估计最优算法

Pub Date : 2024-07-17 DOI:10.1016/j.spl.2024.110217
Laura Bondi , Marcello Pagano , Marco Bonetti
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引用次数: 0

摘要

如果统计单位被抽样的概率与规模变量成正比,那么就会出现规模偏差。举例来说,从人口中抽取个体时,规模较大的家庭所占比例会过高。我们提出了两种精确算法,用于计算规模偏置泊松抽样中稀疏指数的均匀最小方差无偏估计器。即使对于我们感兴趣的小样本量,这两种算法的计算量也很大。作为替代方案,我们提出了第三种基于反傅立叶变换的近似算法。我们还提出了基于最优估计值的精确置信区间,并从均方误差、平均覆盖概率和置信区间宽度两方面,将估计程序的性能与经典的最大似然推断进行了比较。
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The sparsity index in Poisson size-biased sampling: Algorithms for the optimal unbiased estimation from small samples

If the probability that a statistical unit is sampled is proportional to a size variable, then size bias occurs. As an example, when sampling individuals from a population, larger households are overrepresented.

With size-biased sampling, caution must be applied in estimation. We propose two exact algorithms for the calculation of the uniformly minimum variance unbiased estimator for the sparsity index in size-biased Poisson sampling. The algorithms are computationally burdensome even for small sample sizes, which is our setting of interest. As an alternative, a third, approximate algorithm based on the inverse Fourier transform is presented. We provide ready-to-use tables for the value of the optimal estimator.

An exact confidence interval based on the optimal estimator is also proposed, and the performance of the estimation procedure is compared to classical maximum likelihood inference, both in terms of mean squared error and average coverage probability and width of the confidence intervals.

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