平衡联合II型渐进Censoring方案下威布尔分布的贝叶斯推断

Q3 Business, Management and Accounting American Journal of Mathematical and Management Sciences Pub Date : 2020-01-02 DOI:10.1080/01966324.2019.1579124
Shuvashree Mondal, D. Kundu
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引用次数: 21

摘要

摘要渐进审查方案近年来受到了广泛的关注。所有这些发展主要是基于单一人口。最近,Mondal和Kundu(2016)引入了平衡联合渐进审查方案(BJPC),并研究了两个指数种群的精确推理。众所周知,指数分布有一些局限性。在本文中,我们在具有公共形状参数的两个威布尔总体上实现了BJPC方案。这里的处理本质上是纯粹的贝叶斯。在贝叶斯设置下,我们假设尺度参数的贝塔-伽马先验,以及公共形状参数的独立伽马先验。在这些先验假设下,贝叶斯估计量不能以闭合形式获得,我们使用重要性抽样技术来计算贝叶斯估计量和相关的可信区间。我们进一步考虑了基于尺度参数的有序贝塔-伽马先验的参数的顺序受限贝叶斯推断。我们提出了一个基于联合可信模型参数集的期望体积的精度准则来找出最优截尾方案。我们进行了大量的模拟实验来研究估计器的性能,并最终分析了一个真实的数据集以便于说明。
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Bayesian Inference for Weibull Distribution under the Balanced Joint Type-II Progressive Censoring Scheme
SYNOPTIC ABSTRACT Progressive censoring schemes have received considerable attention recently. All of these developments are mainly based on a single population. Recently, Mondal and Kundu (2016) introduced the balanced joint progressive censoring scheme (BJPC), and studied the exact inference for two exponential populations. It is well known that the exponential distribution has some limitations. In this article, we implement the BJPC scheme on two Weibull populations with the common shape parameter. The treatment here is purely Bayesian in nature. Under the Bayesian set up we assume a Beta Gamma prior of the scale parameters, and an independent Gamma prior for the common shape parameter. Under these prior assumptions, the Bayes estimators cannot be obtained in closed forms, and we use the importance sampling technique to compute the Bayes estimators and the associated credible intervals. We further consider the order restricted Bayesian inference of the parameters based on the ordered Beta Gamma priors of the scale parameters. We propose one precision criteria based on expected volume of the joint credible set of model parameters to find out the optimum censoring scheme. We perform extensive simulation experiments to study the performance of the estimators, and finally analyze one real data set for illustrative purposes.
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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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