References
- Aitchison, J., Dunsmore, I. R. (1975). Statistical Prediction Analysis. London: Cambridge University Press.
- AL-Hussaini, E. K. (1999). Predicting observable from a general class of distributions. Journal of Statistical Planning and Inference 79:79–91.
- Ali Mousa, M. A. M. (2001). Inference and prediction for Pareto progressively censored data. Journal of Statistical Computation and Simulation 71:163–181.
- Ali Mousa, M. A. M., AL-Sagheer, S. A. (2005). Bayesian prediction for progressively Type-II censored data from the Rayleigh model. Communications in Statistics Theory and Methods 34:2353–2361.
- Ali Mousa, M. A. M., Jaheen, Z. F. (2002). Bayesian prediction for progressively censored data from the Burr model. Statistical Papers 43:587–593.
- Al-Mutairi, D. K., Ghitany, M. E., Kundu, D. (2013). Inferences on stress-strength reliability from Lindley distributions. Communication in Statistics Theory and Methods 42:1443–1463.
- Balakrishnan, N., Aggarwala, R. (2000). Progressive Censoring: Theory, Methods and Applications. Boston: Birkhauser.
- Balakrishnan, N., Cramer, E. (2014). The Art of Progressive Censoring: Applications to Reliability and Quality. New York: Birkhauser.
- Balakrishnan, N., Cramer, E., Kamps, U. (2001). Bounds for means and variances of progressive Type-II censored order statistics. Statistics & Probability Letters 54:301–315.
- Balakrishnan, N., Hossain, A. (2007). Inference for the Type II generalized logistic distribution under progressive Type II censoring. Journal of Statistical Computation and Simulation 77(12):1013–1031.
- Balakrishnan, N., Kannan, N., Lin, C. T., Wu, S. J. S. (2004). Inference for the extreme value distribution under progressive Type-II censoring logistic distribution under progressive Type II censoring. Journal of Statistical Computation and Simulation 74(1):25–45.
- Balakrishnan, N., Sandhu, R. A. (1995). A simple simulation algorithm for generating progressive Type-II censored samples. The American Statistician 49(2):229–230.
- Basak, I., Basak, P., Balakrishnan, N. (2006). On some predictors of times to failure of censored items in progressively censored samples. Computational Statistics & Data Analysis 50:1313–1337.
- Bayat Mokhtari, E., Habibi Rad, A., Yousefzadeh, F. (2011). Inference for Weibull distribution based on progressively Type-II hybrid censored data. Journal of Statistical Planning and Inference 141:2824–2838.
- Cacciari, M., Motanari, G. C. (1987). A method to estimate the Weibull parameters for Progressively censored tests. IEEE Transactions on Reliability R-36:87–93.
- Cohen, A. C. (1963). Progressively censored samples in the life testing. Technometrics 5:327–339.
- Cohen, A. C., Norgaard, N. J. (1977). Progressively censored sampling in the three-parameter Gamma distribution. Technometrics 19:333–340.
- Dempster, A. p., Laird, N. M., Rubin, D. B. (1977). Maximum likelihood from incomplete data via the EM algorithm. Journal of the Royal Statistical Society Series B 39(1):1–38.
- Faulkenberry, G. D. (1973). A method of obtaining prediction intervals. Journal of the American Statistical Association 68(342):433–435.
- Fernandez, A. J. (2000). Bayesian inference from Type-II doubly censored Rayleigh data. Statistics & Probability Letters 48:393–399.
- Geisser, S. (1993). Predictive Inference: An Introduction. New York: Chapman & Hall.
- Ghafoori, S., Habibi Rad, A., Doostparast, M. (2011). Bayesian two-sample prediction with progressively Type-II censored data for some lifetime models. JIRSS 10(1):63–86.
- Ghitany, M. E., Atieh, B., Nadarajah, S. (2008). Lindley distribution and its application. Mathematics and Computers in Simulation 78:493–506.
- Gupta, R. D., Kundu, D. (2001). Exponentiated Exponential family: An alternative to Gamma and Weibull distributions. Biometrical Journal 43(1):117–130.
- Huang, S. R., Wu, S. J. (2012). Bayesian estimation and prediction for Weibull model with progressive censoring. Journal of Statistical Computation and Simulation 82(11):1607–1620.
- Jung, J., Chung, Y. (2013). Bayesian prediction of Exponentiated Weibull distribution based on progressive Type II censoring. Communications for Statistical Applications and Methods 20(6):427–438.
- Kundu, D., Howlader, H. A. (2010). Bayesian inference and prediction of the inverse Weibull distribution for Type-II censored data. Computational Statistics & Data Analysis 54:1547–1558.
- Lehmann, E. L., Casella, G. (1998). Theory of Point Estimation. 2nd ed. New York: Springer-Verlag.
- Louis, T. A. (1982). Finding the observed information matrix when using the EM algorithm. Journal of the Royal Statistical Society Series B 44(2):226–233.
- McLachlan, G. J., Krishnan, T. (1997). The EM Algorithm and Extensions. New York: Wiley.
- Ng, H. K. T., Chan, P. S., Balakrishnan, N. (2002). Estimation of parameters from progressively censored data using EM algorithm. Computational Statistics & Data Analysis 39:371–386.
- Raqab, M. Z. (2004). Approximate maximum likelihood predictors of future failure times of shifted exponential distributions under multiple type II censoring. Statistical Methods and Applications 13:41–52.
- Raqab, M. Z., Asgharzadeh, A., Valiollahi, R. (2010). Prediction for Pareto distribution based on progressively Type-II censored samples. Computational Statistics & Data Analysis 54:1732–1743.
- Soliman, A. A., Al-Hossain, A. Y., Al-Harbi, M. M. (2011). Predicting observables from Weibull model based on general progressive censored data with asymmetric loss. Statistical Methodology 8:451–461.
- Thomas, D. R., Wilson, W. M. (1972). Linear order statistic estimation for the two-parameter Weibull and Extreme-Value distributions from Type-II progressively censored samples. Technometrics 14:679–691.
- Viveros, R., Balakrishnan, N. (1994). Interval estimation of life characteristics from progressively censored data. Technometrics 36:84–91.