Inference for log‐location‐scale family of distributions under competing risks with progressive type‐I interval censored data

IF 1.4 3区数学 Q2 STATISTICS & PROBABILITY

Statistica Neerlandica Pub Date : 2022-11-02 DOI:10.1111/stan.12282

Soumya Roy, B. Pradhan

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Abstract

In this article, we present statistical inference of unknown lifetime parameters based on a progressive Type‐I interval censored dataset in presence of independent competing risks. A progressive Type‐I interval censoring scheme is a generalization of an interval censoring scheme, allowing intermediate withdrawals of test units at the inspection points. We assume that the lifetime distribution corresponding to a failure mode belongs to a log‐location‐scale family of distributions. Subsequently, we present the maximum likelihood analysis for unknown model parameters. We observe that the numerical computation of the maximum likelihood estimates can be significantly eased by developing an expectation‐maximization algorithm. We demonstrate the same for three popular choices of the log‐location‐scale family of distributions. We then provide Bayesian inference of the unknown lifetime parameters via Gibbs Sampling and a related data augmentation scheme. We compare the performance of the maximum likelihood estimators and Bayesian estimators using a detailed simulation study. We also illustrate the developed methods using a progressive Type‐I interval censored dataset.

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基于渐进式I型区间截尾数据的竞争风险下对数-位置-尺度分布族的推断

在本文中，我们基于存在独立竞争风险的渐进式I型区间截尾数据集提出了未知寿命参数的统计推断。渐进式I型区间截尾方案是区间截尾方案的一种推广，允许在检查点对试验装置进行中间撤离。我们假设失效模式对应的寿命分布属于对数-位置-尺度分布族。随后，我们提出了未知模型参数的最大似然分析。我们观察到，通过开发期望最大化算法，极大似然估计的数值计算可以显着简化。我们对对数-位置-尺度分布家族的三种流行选择进行了相同的演示。然后，我们通过吉布斯采样和相关的数据增强方案提供了未知寿命参数的贝叶斯推断。我们通过详细的仿真研究比较了极大似然估计器和贝叶斯估计器的性能。我们还使用渐进式I型区间截尾数据集说明了开发的方法。

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

Statistica Neerlandica 数学-统计学与概率论

CiteScore

2.60

自引率

6.70%

发文量

审稿时长

>12 weeks

期刊介绍： Statistica Neerlandica has been the journal of the Netherlands Society for Statistics and Operations Research since 1946. It covers all areas of statistics, from theoretical to applied, with a special emphasis on mathematical statistics, statistics for the behavioural sciences and biostatistics. This wide scope is reflected by the expertise of the journal’s editors representing these areas. The diverse editorial board is committed to a fast and fair reviewing process, and will judge submissions on quality, correctness, relevance and originality. Statistica Neerlandica encourages transparency and reproducibility, and offers online resources to make data, code, simulation results and other additional materials publicly available.