Multi-Stage Estimation Methodologies for an Inverse Gaussian Mean with Known Coefficient of Variation

Q3 Business, Management and Accounting American Journal of Mathematical and Management Sciences Pub Date : 2021-08-26 DOI:10.1080/01966324.2021.1966350
Neeraj Joshi, Sudeep R. Bapat, A. Shukla
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引用次数: 1

Abstract

Abstract In this paper, we develop accelerated sequential and stage procedures for estimating the mean of an inverse Gaussian distribution when the population coefficient of variation is known. The problems of minimum risk and bounded risk point estimation are handled. The estimation procedures are developed under an interesting weighted squared-error loss function and our aim is to control the associated risk functions. In spite of the usual estimator, i.e., the sample mean, Searls (1964) estimator is utilized for the purpose of estimation. Second-order asymptotics are obtained for the expected sample size and risk associated with the proposed multi-stage procedures. Further, it is established that the Searls’ estimator dominates the usual estimator (sample mean) under the proposed procedures. Extensive simulation analysis is carried out in support of the encouraging performances of the proposed methodologies and a real data example is also provided for illustrative purposes.
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已知变异系数的高斯反均值多阶段估计方法
摘要在本文中,当总体变异系数已知时,我们开发了估计反高斯分布平均值的加速序列和阶段程序。处理了最小风险和有界风险点估计问题。估计程序是在一个有趣的加权平方误差损失函数下开发的,我们的目标是控制相关的风险函数。尽管有通常的估计量,即样本平均值,Searls(1964)估计量还是用于估计的目的。获得了与所提出的多阶段程序相关的预期样本量和风险的二阶渐近性。此外,还证明了在所提出的程序下,西尔斯估计量支配着通常的估计量(样本均值)。为了支持所提出的方法令人鼓舞的性能,进行了广泛的模拟分析,并提供了一个真实的数据示例以供说明。
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来源期刊
American Journal of Mathematical and Management Sciences
American Journal of Mathematical and Management Sciences Business, Management and Accounting-Business, Management and Accounting (all)
CiteScore
2.70
自引率
0.00%
发文量
5
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