Pitman comparisons of predictors of censored observations from progressively censored samples for exponential distribution
DOI10.1080/00949655.2015.1071820OpenAlexW1742084006MaRDI QIDQ5222423
Laila A. Alkhalfan, Mohammad Zayed Raqab, Narayanaswamy Balakrishnan
Publication date: 1 April 2020
Published in: Journal of Statistical Computation and Simulation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00949655.2015.1071820
predictionorder statisticsexponential distributionPitman closenessmean square prediction errorprogressively censored data
Inequalities; stochastic orderings (60E15) Order statistics; empirical distribution functions (62G30) Probability distributions: general theory (60E05)
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Cites Work
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- The art of progressive censoring. Applications to reliability and quality
- On some predictors of times to failure of censored items in progressively censored samples
- Maximum likelihood prediction
- On some predictors of future order statistics
- Median unbiasedness in an invariant prediction problem
- Some properties of progressive censored order statistics from arbitrary and uniform distributions with applications to inference and simulation.
- Modified maximum likelihood predictors of future order statistics from normal samples
- Testing for ordered failure rates under general progressive censoring
- Progressive censoring methodology: an appraisal (with comments and rejoinder)
- Exponentiated beta distributions
- Pitman Closeness Comparison of Best Linear Unbiased and Invariant Predictors for Exponential Distribution in One- and Two-Sample Situations
- Pitman Closeness of Order Statistics to Population Quantiles
- Best Linear Unbiased Prediction of Order Statistics in Location and Scale Families
- Order Statistics
- Best Linear Unbiased Prediction in the Generalized Linear Regression Model
- Advances in reliability
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