倒Topp-Leone分布:对存在随机滤波的j形频率函数族的贡献

H. Muhammed, E. A. Muhammed
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引用次数: 1

摘要

本文研究了样本完全随机截尾情况下倒Topp-Leone分布形状参数的贝叶斯和非贝叶斯估计。提出了未知参数的最大似然估计量和贝叶斯估计量。贝叶斯估计(BEs)是基于平方误差损失(SEL)函数并使用马尔可夫链蒙特卡罗(MCMC)技术计算的。计算了渐近、bootstrap(p,t)和最高后验密度区间。针对贝叶斯估计,提出了Metropolis Hasting算法。进行蒙特卡罗模拟以比较所提出的方法的性能,并分析了一个真实数据集以便于说明。
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Inverted Topp-Leone Distribution: Contribution to a Family of J-Shaped Frequency Functions in Presence of Random Censoring
In this paper, Bayesian and non-Bayesian estimation of the inverted Topp-Leone distribution shape parameter are studied when the sample is complete and random censored. The maximum likelihood estimator (MLE) and Bayes estimator of the unknown parameter are proposed. The Bayes estimates (BEs) have been computed based on the squared error loss (SEL) function and using Markov Chain Monte Carlo (MCMC) techniques. The asymptotic, bootstrap (p,t), and highest posterior density intervals are computed. The Metropolis Hasting algorithm is proposed for Bayes estimates. Monte Carlo simulation is performed to compare the performances of the proposed methods and one real data set has been analyzed for illustrative purposes.
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