Non-parametric Estimator for a Finite Population Total Based on Edgeworth Expansion

J. O. Okungu, G. Orwa, R. Otieno
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Abstract

In survey sampling, the main objective is to make inference about the entire population parameters using the sample statistics. In this study, a nonparametric estimator of finite population total is proposed and the coverage probabilities using the Edgeworth expansion explored. Three properties; unbiasedness, efficiency and the confidence interval of the proposed estimator are studied. There is a lot of literature on study of two properties; unbiasedness and efficiency of the finite population total. This study therefore has more focus on confidence interval and coverage probability. The amount of bias and MSE are studied partially analytically, followed by an empirical study on the two properties and the confidence interval of the proposed estimator. Based on the empirical study with simulations in R, the proposed estimator resulted into smaller bias and MSE compared to the nonparametric estimator due to [6], the design-based Horvitz-Thompson estimator and the model-based ratio estimator. Further, the proposed estimator is tighter compared to the other three considered in this study and has higher converging coverage probabilities.
基于Edgeworth展开的有限总体的非参数估计
在调查抽样中,主要目的是利用样本统计量对整个总体参数进行推断。本文提出了有限总体的非参数估计,并利用Edgeworth展开式探讨了覆盖概率。三个属性;研究了该估计量的无偏性、效率和置信区间。关于两个性质的研究有很多文献;有限总体的无偏性和效率。因此,本研究更关注置信区间和覆盖概率。对偏置量和均方误差进行了部分分析研究,然后对所提估计量的两个性质和置信区间进行了实证研究。基于R中模拟的实证研究表明,与非参数估计器、基于设计的Horvitz-Thompson估计器和基于模型的比率估计器相比,该估计器的偏差和均方差更小。此外,与本研究中考虑的其他三种估计器相比,所提出的估计器更加紧密,并且具有更高的收敛覆盖概率。
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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