基于渐进式首次失效截尾样本的多构件系统应力-强度可靠性推断

IF 1.7 4区工程技术 Q3 ENGINEERING, INDUSTRIAL

Proceedings of the Institution of Mechanical Engineers Part O-Journal of Risk and Reliability Pub Date : 2023-08-04 DOI:10.1177/1748006x231188075

A. Kohansal, Carlos J. Pérez-González, Arturo J. Fernández

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引用次数: 0

摘要

本文研究了渐进式首次失效抽样下多部件系统应力-强度可靠性的统计估计，其中各部件的寿命分布服从修正Kumaraswamy分布。同时考虑了可靠性函数中参数的点估计和区间估计。为此，得到了极大似然估计(MLE)、渐近置信区间、均匀最小方差无偏估计(UMVUE)、近似贝叶斯估计和最高后验密度估计(HPD)等估计。通过蒙特卡罗仿真，比较了不同估计之间的性能。然后通过一个案例分析来说明所提出的方法。

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Inference on the stress-strength reliability of multi-component systems based on progressive first failure censored samples

This paper studies the statistical estimation of the stress-strength reliability of multi-component systems under the progressive first failure censoring samples, where the lifetime distribution of each component follows the modified Kumaraswamy distribution. Both the point and interval estimations of the parameters in the reliability function are considered. To this aim, some estimations such as maximum likelihood estimation (MLE), asymptotic confidence intervals, uniformly minimum variance unbiased estimation (UMVUE), approximate Bayes estimation, and highest posterior density (HPD) intervals are obtained. By employing the Monte Carlo simulation, comparison of the performance between different estimates is provided. The paper then analyzes a case study for illustration of the proposed method.

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来源期刊

Proceedings of the Institution of Mechanical Engineers Part O-Journal of Risk and Reliability ENGINEERING, MULTIDISCIPLINARY-ENGINEERING, INDUSTRIAL

CiteScore

4.50

自引率

19.00%

发文量

审稿时长

6-12 weeks

期刊介绍： The Journal of Risk and Reliability is for researchers and practitioners who are involved in the field of risk analysis and reliability engineering. The remit of the Journal covers concepts, theories, principles, approaches, methods and models for the proper understanding, assessment, characterisation and management of the risk and reliability of engineering systems. The journal welcomes papers which are based on mathematical and probabilistic analysis, simulation and/or optimisation, as well as works highlighting conceptual and managerial issues. Papers that provide perspectives on current practices and methods, and how to improve these, are also welcome