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Inference for a constant-stress model under progressive type-I interval censored data from the generalized half-normal distribution

Mohamed Sief, Xinsheng Liu, Abd El-Raheem M. Abd El-Raheem

2021Journal of Statistical Computation and Simulation11 citationsDOI

Abstract

In this paper, we discuss the problem of constant-stress accelerated life test when the failure data are progressive type-I interval censored. Both classical and Bayesian inferential approaches of the distribution parameters and reliability characteristics are discussed. In the classical scenario, the maximum likelihood estimates are approximated using the EM algorithm and the mid-point approximation method. Furthermore, the model's parameters are estimated by method of moments. Next in the Bayesian framework, the point estimates of unknown parameters are obtained using Tierney-Kadane's technique and Markov Chain Monte Carlo (MCMC) method. In addition, both approximate and credible confidence intervals (CIs) of the estimators are constructed. For illustration purpose, a Monte Carlo simulation is conducted to investigate the performance of the proposed estimators and a real data set is analysed.

Topics & Concepts

MathematicsMarkov chain Monte CarloEstimatorMonte Carlo methodApplied mathematicsPoint estimationBayesian inferenceConstant (computer programming)StatisticsInterval estimationInferenceBayesian probabilityConfidence intervalComputer scienceArtificial intelligenceProgramming languageStatistical Distribution Estimation and ApplicationsReliability and Maintenance OptimizationProbabilistic and Robust Engineering Design