Bias-Corrected Maximum Likelihood Estimators of the Parameters of the Unit-Weibull Distribution

IF 0.6 Q4 STATISTICS & PROBABILITY

Austrian Journal of Statistics Pub Date : 2021-07-05 DOI:10.17713/AJS.V50I3.1023

A. Menezes, J. Mazucheli, F. Alqallaf, M. E. Ghitany

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引用次数: 2

Abstract

It is well known that the maximum likelihood estimates (MLEs) have appealing statistical properties. Under fairly mild conditions their asymptotic distribution is normal, and no other estimator has a smaller asymptotic variance.However, in finite samples the maximum likelihood estimates are often biased estimates and the bias disappears as the sample size grows.Mazucheli, Menezes, and Ghitany (2018b) introduced a two-parameter unit-Weibull distribution which is useful for modeling data on the unit interval, however its MLEs are biased in finite samples.In this paper, we adopt three approaches for bias reduction of the MLEs of the parameters of unit-Weibull distribution.The first approach is the analytical methodology suggested by Cox and Snell (1968), the second is based on parametric bootstrap resampling method, and the third is the preventive approach introduced by Firth (1993).The results from Monte Carlo simulations revealed that the biases of the estimates should not be ignored and the bias reduction approaches are equally efficient. However, the first approach is easier to implement.Finally, applications to two real data sets are presented for illustrative purposes.

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单位威布尔分布参数的偏差校正极大似然估计

众所周知，最大似然估计(MLEs)具有吸引人的统计性质。在相当温和的条件下，它们的渐近分布是正态的，并且没有其他估计量具有更小的渐近方差。然而，在有限样本中，最大似然估计往往是有偏差的估计，随着样本量的增加，偏差会消失。Mazucheli, Menezes和Ghitany (2018b)引入了一种双参数单位威布尔分布，该分布有助于在单位区间上对数据进行建模，但其mle在有限样本中存在偏差。本文采用三种方法对单位威布尔分布参数的最大似然值进行减偏。第一种方法是Cox和Snell(1968)提出的分析方法，第二种方法是基于参数bootstrap重采样方法，第三种方法是Firth(1993)提出的预防性方法。蒙特卡罗模拟的结果表明，估计的偏差不应被忽略，并且偏差减少方法同样有效。然而，第一种方法更容易实现。最后，为了说明目的，给出了对两个实际数据集的应用。

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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来源期刊

Austrian Journal of Statistics STATISTICS & PROBABILITY-

CiteScore

1.10

自引率

0.00%

发文量

审稿时长

24 weeks

期刊介绍： The Austrian Journal of Statistics is an open-access journal (without any fees) with a long history and is published approximately quarterly by the Austrian Statistical Society. Its general objective is to promote and extend the use of statistical methods in all kind of theoretical and applied disciplines. The Austrian Journal of Statistics is indexed in many data bases, such as Scopus (by Elsevier), Web of Science - ESCI by Clarivate Analytics (formely Thompson & Reuters), DOAJ, Scimago, and many more. The current estimated impact factor (via Publish or Perish) is 0.775, see HERE, or even more indices HERE. Austrian Journal of Statistics ISNN number is 1026597X Original papers and review articles in English will be published in the Austrian Journal of Statistics if judged consistently with these general aims. All papers will be refereed. Special topics sections will appear from time to time. Each section will have as a theme a specialized area of statistical application, theory, or methodology. Technical notes or problems for considerations under Shorter Communications are also invited. A special section is reserved for book reviews.