https://orcid.org/0000-0002-3863-7141
References
- Almalki SJ, Nadarajah S. Modifications of the Weibull distribution: A review. Reliab Eng Syst Saf. 2014;124:32–55. doi: 10.1016/j.ress.2013.11.010
- Keller A, Goblin M, Farnworth N. Reliability analysis of commercial vehicle engines. Reliab Eng. 1985;10:15–25. doi: 10.1016/0143-8174(85)90039-3
- Murthy DP, Xie M, Jiang R. Weibull models. Hoboken, NJ, USA: John Wiley & Sons; 2004.
- Hanagal DD, Bhalerao NN. Software reliability growth models. Singapore, SG: Springer; 2021.
- Musleh RM, Helu A. Estimation of the inverse weibull distribution based on progressively censored data: comparative study. Reliab Eng Syst Saf. 2014;131:216–227. doi: 10.1016/j.ress.2014.07.006
- Langlands AO, Pocock SJ, Kerr GR, et al. Long-term survival of patients with breast cancer: a study of the curability of the disease. Br Med J. 1979;2:1247–1251. doi: 10.1136/bmj.2.6200.1247
- Bennett S. Log-logistic regression models for survival data. J R Stat Soc Ser C Appl Stat. 1983;32:165–171.
- Prentice RL. Exponential survivals with censoring and explanatory variables. Biometrika. 1973;60:279–288. doi: 10.1093/biomet/60.2.279
- Davies KF. Pitman closeness results for Type-I hybrid censored data from exponential distribution. J Stat Comput Simul. 2021;91:58–80. doi: 10.1080/00949655.2020.1806280
- Long B. Estimation and prediction for topp–leone distribution using double Type-I hybrid censored data. J Stat Comput Simul. 2022;92:2999–3019. doi: 10.1080/00949655.2022.2053977
- Elshahhat A, Nassar M. Analysis of adaptive Type-II progressively hybrid censoring with binomial removals. J Stat Comput Simul. 2023;93:1077–1103. doi: 10.1080/00949655.2022.2127149
- Zhang CW, Zhang T, Xu D, et al. Analyzing highly censored reliability data without exact failure times: an efficient tool for practitioners. Qual Eng. 2013;25:392–400. doi: 10.1080/08982112.2013.783598
- Jia X, Nadarajah S, Guo B. Exact inference on weibull parameters with multiply Type-I censored data. IEEE Trans Reliab. 2018;67:432–445. doi: 10.1109/TR.24
- McCool JI. Inference on weibull percentiles from sudden death tests using maximum likelihood. IEEE Trans Reliab. 1970;R-19:177–179. doi: 10.1109/TR.1970.5216439
- Carter AD. Introduction. In: Mechanical Reliability. London, UK: Palgrave; 1986.
- Jia X, Wang D, Jiang P, et al. Inference on the reliability of weibull distribution with multiply Type-I censored data. Reliab Eng Syst Saf. 2016;150:171–181. doi: 10.1016/j.ress.2016.01.025
- Jia X. Reliability analysis for q-weibull distribution with multiply Type-I censored data. Qual Reliab Eng Int. 2021;37:2790–2817. doi: 10.1002/qre.v37.6
- Wang F-K. Using BBPSO algorithm to estimate the Weibull parameters with censored data. Commun Stat Simul Comput. 2014;43:2614–2627. doi: 10.1080/03610918.2012.762386
- Mohie El-Din M, Abu-Moussa M. Statistical inference and prediction for the Gompertz distribution based on multiply Type-I censored data. J Egypt Math Soc. 2018;26:218–234. doi: 10.21608/joems.2018.2526.1006
- Jia X, Jiang P, Guo B. Reliability evaluation for weibull distribution under multiply Type-I censoring. J Cent South Univ. 2015;22:3506–3511. doi: 10.1007/s11771-015-2890-2
- Calabria R, Pulcini G. On the maximum likelihood and least-squares estimation in the inverse Weibull distribution. Stat Appl. 1990;2:53–66.
- Akgül FG, Şenoğlu B, Arslan T. An alternative distribution to Weibull for modeling the wind speed data: inverse Weibull distribution. Energy Convers Manag. 2016;114:234–240. doi: 10.1016/j.enconman.2016.02.026
- Singh SK, Singh U, Kumar D. Bayesian estimation of parameters of inverse Weibull distribution. J Appl Stat. 2013;40:1597–1607. doi: 10.1080/02664763.2013.789492
- Jazi MA, Lai C-D, Alamatsaz MH. A discrete inverse Weibull distribution and estimation of its parameters. Stat Methodol. 2010;7:121–132. doi: 10.1016/j.stamet.2009.11.001
- Noor F, Aslam M. Bayesian inference of the inverse Weibull mixture distribution using Type-I censoring. J Appl Stat. 2013;40:1076–1089. doi: 10.1080/02664763.2013.780157
- Algarni A, Elgarhy M, Almarashi AM, et al. Classical and Bayesian estimation of the inverse Weibull distribution: using progressive Type-I censoring scheme. Adv Civil Eng. 2021;2021:1–15. doi: 10.1155/2021/5701529
- Kundu D, Howlader H. Bayesian inference and prediction of the inverse Weibull distribution for Type-II censored data. Comput Stat Data Anal. 2010;54:1547–1558. doi: 10.1016/j.csda.2010.01.003
- Sultan K, Alsadat N, Kundu D. Bayesian and maximum likelihood estimations of the inverse Weibull parameters under progressive Type-II censoring. J Stat Comput Simul. 2014;84:2248–2265. doi: 10.1080/00949655.2013.788652
- Muhammed HZ, Almetwally EM. Bayesian and non-Bayesian estimation for the bivariate inverse Weibull distribution under progressive Type-II censoring. Ann Data Sci. 2023;10:481–512. doi: 10.1007/s40745-020-00316-7
- Nassar M, Abo-Kasem O. Estimation of the inverse Weibull parameters under adaptive Type-II progressive hybrid censoring scheme. J Comput Appl Math. 2017;315:228–239. doi: 10.1016/j.cam.2016.11.012
- Greene WH. Econometric analysis. 4th ed. International edition. Upper Saddle River, NJ: Prentice Hall; 1999. p. 201–215.
- Zhang J, Ng HKT, Balakrishnan N. Statistical inference of component lifetimes with location-scale distributions from censored system failure data with known signature. IEEE Trans Reliab. 2015;64:613–626. doi: 10.1109/TR.2015.2417373
- Skinner KR, Keats JB, Zimmer WJ. A comparison of three estimators of the Weibull parameters. Qual Reliab Eng Int. 2001;17:249–256. doi: 10.1002/qre.v17:4
- Lindley DV. Approximate Bayesian methods. Trab Estad Investig Oper. 1980;31:223–245. doi: 10.1007/BF02888353
- Khan MS, Pasha G, Pasha AH. Theoretical analysis of inverse Weibull distribution. WSEAS Trans Math. 2008;7:30–38.
- Singh S, Tripathi YM. Estimating the parameters of an inverse Weibull distribution under progressive Type-I interval censoring. Stat Pap. 2018;59:21–56. doi: 10.1007/s00362-016-0750-2
- Kumar K, Kumar I. Estimation in inverse Weibull distribution based on randomly censored data. Statistica. 2019;79:47–74.