Estimating Common Scale Parameter of Two Logistic Populations: A Bayesian Study

Q3 Business, Management and Accounting American Journal of Mathematical and Management Sciences Pub Date : 2020-10-26 DOI:10.1080/01966324.2020.1833794
N. Nagamani, M. Tripathy, Somesh Kumar
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引用次数: 3

Abstract

Abstract Estimation under equality restrictions is an age old problem and has been considered by several researchers in the past due to practical applications and theoretical challenges involved in it. Particularly, the problem has been extensively studied from classical as well as decision theoretic point of view when the underlying distribution is normal. In this paper, we consider the problem when the underlying distribution is non-normal, say, logistic. Specifically, estimation of the common scale parameter of two logistic populations has been considered when the location parameters are unknown. It is observed that closed forms of the maximum likelihood estimators (MLEs) for the associated parameters do not exist. Using certain numerical techniques the MLEs have been derived. The asymptotic confidence intervals have been derived numerically too, as these also depend on the MLEs. Approximate Bayes estimators are proposed using non-informative as well as conjugate priors with respect to the squared error (SE) and the LINEX loss functions. A simulation study has been conducted to evaluate the proposed estimators and compare their performances through mean squared error (MSE) and bias. Finally, two real life examples have been considered in order to show the potential applications of the proposed model and illustrate the method of estimation.
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估计两个Logistic总体的共同尺度参数:一个贝叶斯研究
摘要等式约束下的估计是一个古老的问题,由于其实际应用和理论挑战,过去一直被许多研究者所关注。特别是,当底层分布为正态分布时,从经典和决策理论的角度对该问题进行了广泛的研究。在本文中,我们考虑底层分布是非正态分布的问题,即逻辑分布。具体地说,考虑了在位置参数未知的情况下,两个logistic总体的共同尺度参数的估计。观察到相关参数的最大似然估计的封闭形式不存在。利用一定的数值技术推导出了最大误差。渐近置信区间也用数值方法推导出来,因为它们也依赖于最大似然值。利用非信息先验和共轭先验对平方误差(SE)和LINEX损失函数提出了近似贝叶斯估计。通过仿真研究对所提出的估计器进行了评价,并通过均方误差(MSE)和偏差比较了它们的性能。最后,考虑了两个现实生活中的例子,以显示所提出的模型的潜在应用,并说明了估计方法。
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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
期刊最新文献
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