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Reliability Inference for the Multicomponent System Based on Progressively Type II Censored Samples from Generalized Pareto Distributions

Lauren Sauer, Yuhlong Lio, Tzong‐Ru Tsai

2020Mathematics19 citationsDOIOpen Access PDF

Abstract

In this paper, the reliability of a k-component system, in which all components are subject to common stress, is considered. The multicomponent system will continue to survive if at least s out of k components’ strength exceed the common stress. The system reliability is investigated by utilizing the maximum likelihood estimator based on progressively type II censored samples from generalized Pareto distributions. The confidence interval of the system reliability can be obtained by using asymptotic normality with Fisher information matrix or bootstrap method approximation. An intensive simulation study is conducted to evaluate the performance of maximum likelihood estimators of the model parameters and system reliability for a variety of cases. For the confidence interval of the system reliability, simulation results indicate the bootstrap method approximation outperforms over the asymptotic normality approximation in terms of coverage probability.

Topics & Concepts

EstimatorReliability (semiconductor)MathematicsConfidence intervalAsymptotic distributionInferenceFisher informationStatisticsPareto principleNormalityDelta methodApplied mathematicsCoverage probabilityStatistical inferenceComputer scienceArtificial intelligencePower (physics)Quantum mechanicsPhysicsStatistical Distribution Estimation and ApplicationsProbabilistic and Robust Engineering DesignHydrology and Drought Analysis
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