http://orcid.org/0000-0001-5185-7037
References
- Meeker WQ, Escobar LA. Statistical methods and reliability data. New York: Wiley; 1998.
- Lawless JF. Statistical models and methods for lifetime data. New York: Wiley; 1982.
- Epstein B, Sobel M. Life testing. J Am Stat Assoc. 1953;48:486–502. doi: 10.1080/01621459.1953.10483488
- Epstein B, Sobel M. Some theorems relevant to life testing from an exponential distribution. Ann Math Stat. 1954;25:375–381.
- Epstein B. Simple estimators of the parameters of exponential distributions when samples are censored. Ann Inst Statist Math. 1956;8:15–26. doi: 10.1007/BF02863562
- Balakrishnan N, Basu AP. Exponential distribution: theory, methods and applications. Amsterdam: Gordon and Breach Publishers; 1995.
- Balakrishnan N, Cramer E. The art of progressive censoring. New York: Birkhauser; 2014.
- Khan HMR, Haq MS, Provost SB. Predictive inference for future responses given a doubly censored sample from a two parameter exponential distribution. J Statist Plan Infer. 2006;136:3156–3172. doi: 10.1016/j.jspi.2004.12.002
- Sun J. The statistical analysis of interval-censored failure time data. New York: Springer; 2006.
- Sindhu TN, Feroze N, Aslam M. Analysis of doubly censored Burr type II distribution: a Bayesian look. Electr J Appl Statist Anal. 2015;8:154–169.
- Feroze N, Aslam M. Bayesian analysis of Burr type X distribution under complete and censored samples. Int J Pure Appl Sci Technol. 2012;11:16–28.
- Pak A, Parham GA, Saraj M. On estimation of Rayleigh scale parameter under doubly type II censoring from imprecise data. J Data Sci. 2013;11:305–322.
- Elfessi A. Estimation of a linear function of the parameters of an exponential distribution from doubly censored samples. Statist Prob Lett. 1997;42:251–259. doi: 10.1016/S0167-7152(97)81470-8
- Chakraborti S, Li J. Confidence interval estimation of a normal percentile. Am Stat. 2007;61:331–336. doi: 10.1198/000313007X244457
- Keating JP, Mason RL, Balakrishnan N. Percentile estimators in location-scale parameter families under absolute loss. Metrika. 2010;72:351–367. doi: 10.1007/s00184-009-0257-0
- Madi MT. On the invariant estimation of an exponential scale using doubly censored data. Stat Prob Lett. 2002;56:77–82. doi: 10.1016/S0167-7152(01)00174-2
- Brewster JF. Alternative estimators for the scale parameter of the exponential distribution with unknown location. Ann Stat. 1974;2:553–557. doi: 10.1214/aos/1176342715
- Petropoulos C, Kourouklis S. Estimation of an exponential quantile under a general loss and an alternative estimator under quadratic loss. Ann Inst Statist Math. 2001;53:746–759. doi: 10.1023/A:1014648819462
- Kubokawa T. A unified approach to improving equivariant estimators. Ann Stat. 1994;22:290–299. doi: 10.1214/aos/1176325369
- Marchand É, Strawderman WE. Improving on the minimum risk equivariant estimator of a location parameter which is constrained to an interval or a half interval. Ann Inst Stat Math. 2005;57:129–143. doi: 10.1007/BF02506883
- Marchand É, Strawderman WE. On improving on the minimum risk equivariant estimator of a scale parameter under a lower-bound constraint. J Stat Plan Infer. 2005;134:90–101. doi: 10.1016/j.jspi.2004.04.001
- Brewster JF, Zidek JV. Improving on equivariant estimators. Ann Stat. 1974;2:21–38. doi: 10.1214/aos/1176342610
- Stein C. Inadmissibility of the usual estimator for the variance of a normal distribution with unknown mean. Ann Inst Stat Math. 1964;16:155–160. doi: 10.1007/BF02868569
- Choi KP. On the medians of gamma distributions and an equation of Ramanujan. Proc Am Math Soc. 1994;121:245–251. doi: 10.1090/S0002-9939-1994-1195477-8
- Lehmann EL, Romano JP. Testing statistical hypotheses. New York: Springer Science & Business Media; 2005.
- Kubokawa T. Shrinkage and modification techniques in estimation of variance and the related problems: a review. Comm Stat Theor Meth. 1999;28:613–650. doi: 10.1080/03610929908832317
- Kubokawa T, A unified approach to improving equivariant estimators. Technical Report METR 91-1, Dept. Mathematical Engineering, Univ. Tokyo, 1991.