https://orcid.org/0000-0002-1382-0994
References
- Ahmad, S. P., A. Ahmad, and A. Ahmed. 2016. Bayesian estimation for the class of lifetime distributions under different loss functions. Statistics and Applications 14 (1):75–91.
- Ahmadi, J., M. Doostparast, and A. Parsian. 2005. Estimation and prediction in a two-parameter Exponential distribution based on k-record values under LINEX loss function. Communications in Statistics - Theory and Methods 34 (4):795–805. doi:10.1081/STA-200054393.
- Al-Bayyati, H. N. 2002. Comparing methods of estimating Weibull failure models using simulation. Unpublished PhD thesis, College of Administration and Economics, Baghdad University, Iraq.
- Baklizi, A. 2017. Preliminary test estimation of the threshold in the two-parameter Exponential distribution based on records and minimax regret significance levels. American Journal of Mathematical and Management Sciences 36 (3):196–204. doi:10.1080/01966324.2017.1310005.
- Balakrishnan, N., and A. P. Basu. 1995. The exponential distribution-theory, methods and applications. The Netherland: Gordon and Breach Publishers.
- Balakrishnan, N., and R. A. Sandhu. 1996. Best linear unbiased and maximum likelihood estimation for Exponential distributions under general progressive type-II censored samples. Sankhya: The Indian Journal of Statistics, Series B 58:1–9.
- Balasubramanian, K., and N. Balakrishnan. 1992. Estimation for one- and two-parameter exponential distributions under multiple type-II censoring. Statistical Papers 33 (1):203–16. doi:10.1007/BF02925325.
- Cai, Y., and W. Gui. 2021. Classical and Bayesian inference for a progressive first-failure censored left-truncated Normal distribution. Symmetry 13 (3):490. doi:10.3390/sym13030490.
- Chan, P. S., H. K. T. Ng, and F. Su. 2015. Exact likelihood inference for the two-parameter exponential distribution under type-II progressively hybrid censoring. Metrika 78 (6):747–70. doi:10.1007/s00184-014-0525-5.
- Delavari, M., E. Deiri, Z. Khodadadi, and K. Zare. 2021. A Bayesian shrinkage estimation in inverse Weibull distribution type-II censored data using prior point information. Life Cycle Reliability and Safety Engineering 11:1–10. doi:10.1007/s41872-021-00175-y.
- Dey, S., and T. Dey. 2011. Rayleigh distribution revisited via an extension of Jeffreys prior information and a new loss function. Revstat-Statistical Journal 9 (3):213–26.
- Dey, S., S. Singh, Y. M. Tripathi, and A. Asgharzadeh. 2016. Estimation and prediction for a progressively censored generalized inverted exponential distribution. Statistical Methodology 32:185–202. doi:10.1016/j.stamet.2016.05.007.
- Ferreira, J., A. Bekker, and M. Arashi. 2016. Objective Bayesian estimators for the right censored Rayleigh distribution: Evaluating the Al-Bayatti loss function. Revstat–Statistical Journal 14 (4):433–54.
- Gui, W. 2018. Reliability estimation for the two-parameter Exponential family based on progressively type-II censored data. International Journal of Reliability, Quality and Safety Engineering 25 (1):1850005. doi:10.1142/S0218539318500055.
- Hassan, A. S., and S. G. Nassr. 2021. Parameter estimation of an extended inverse power Lomax distribution with type-I right censored data. Communications for Statistical Applications and Methods 28 (2):99–118. doi:10.29220/CSAM.2021.28.2.099.
- Jiang, T. A., and L. Wong. 2012. Interval estimations of the two-parameter Exponential distribution. Journal of Probability and Statistics 2012:1–8. doi:10.1155/2012/734575.
- Johnson, N. L., S. Kotz, and N. Balakrishnan. 1994. Continuous univariate distributions. 2nd ed. New York: John Wiley & Sons, Inc.
- Kececioglu, D. 1991. Reliability engineering handbook. Englewood Cliffs, NJ: Prentice Hall, Inc.
- Krishna, H., and N. Goel. 2018. Classical and Bayesian inference in two parameter Exponential distribution with randomly censored data. Computational Statistics 33 (1):249–75. doi:10.1007/s00180-017-0725-3.
- Krishnamoorthy, K., and Y. Xia. 2018. Confidence intervals for a two parameter Exponential distribution: One- and two-sample problems. Communications in Statistics - Theory and Methods 47 (4):935–52. doi:10.1080/03610926.2017.1313983.
- Naghizadeh Qomi, M. 2017. Bayesian shrinkage estimation based on Rayleigh type-II censored data. Communications in Statistics - Theory and Methods 46 (19):9859–68. doi:10.1080/03610926.2016.1222440.
- Prakash, G., and D. C. Singh. 2008. Shrinkage estimation in exponential type-II censored data under LINEX loss. Journal of the Korean Statistical Society 37 (1):53–61. doi:10.1016/j.jkss.2007.07.002.
- Seo, J. I., and Y. Kim. 2017. Robust Bayesian estimation of a two-parameter exponential distribution under generalized type-I progressive hybrid censoring. Communications in Statistics - Simulation and Computation 46 (7):5795–807. doi:10.1080/03610918.2016.1183779.
- Singh, K., R. Kumar, S. Singh, and U. Singh. 2016. Maximum product spacings method for the estimation of parameters of generalized inverted exponential distribution under progressive type-II censoring. Journal of Statistics and Management Systems 19 (2):219–45. doi:10.1080/09720510.2015.1023553.
- Singh, S., and Y. M. Tripathi. 2018. Estimating the parameters of an inverse Weibull distribution under progressive type-I interval censoring. Statistical Papers 59 (1):21–56. doi:10.1007/s00362-016-0750-2.
- Soliman, A. A. 2000. Comparison of LINEX and quadratic Bayes estimators for the Rayleigh distribution. Communications in Statistics - Theory and Methods 29 (1):95–107. doi:10.1080/03610920008832471.
- Thompson, J. R. 1968. Some shrunken techniques for estimating the Mean. Journal of the American Statistical Association 63:113–22.
- Zhang, J. 2018. Minimum volume confidence sets for two parameter Exponential distributions. The American Statistician 72 (3):213–8. doi:10.1080/00031305.2016.1264315.