References
- Birnbaum ZW. On a use of the Mann-Whitney statistic. In: Proceedings of the third Berkeley symposium on mathematical statistics and probability. Vol. 1. Berkeley (CA): University of California Press; 1956. p. 13–17.
- Kundu D, Gupta RD. Estimation of P(Y<X) for generalized exponential distribution. Metrika. 2005;61(3):291–308. doi: 10.1007/s001840400345
- Kundu D, Raqab MZ. Estimation of R=P(Y<X) for three-parameter Weibull distribution. Stat Probab Lett. 2009;79(17):1839–1846. doi: 10.1016/j.spl.2009.05.026
- Kundu D, Raqab MZ. Estimation of R=P(Y<X) for three-parameter generalized Rayleigh distribution. J Stat Comput Simul. 2015;85(4):725–739. doi: 10.1080/00949655.2013.839678
- Khan AH, Jan T. Estimation of stress-strength reliability model using finite mixture of two parameter Lindley distributions. J Stat Appl Probab. 2015;4(1):147–159.
- Nadar M, Kizilaslan F. Classical and Bayesian estimation of P(Y<X) using upper record values from Kumaraswamy's distribution. Stat Pap. 2014;55(3):751–783. doi: 10.1007/s00362-013-0526-x
- Kotz S, Lumelskii Y, Pensky M. The stress-strength model and its generalizations: theory and applications. Singapore: World Scientific Press; 2003.
- Bhattacharyya G, Johnson RA. Estimation of reliability in a multicomponent stress-strength model. J Am Stat Assoc. 1974;69(348):966–970. doi: 10.1080/01621459.1974.10480238
- Rao GS, Kantam RRL. Estimation of reliability in multicomponent stress-strength model: log-logistic distribution. Electron J Appl Stat Anal. 2010;3(2):75–84.
- Rao GS. Estimation of reliability in multicomponent stress-strength based on generalized exponential distribution. Rev Colomb Estad. 2012;35(1):67–76.
- Rao GS. Estimation of reliability in multicomponent stress-strength based on generalized inverted exponential distribution. Int J Curr Res Rev. 2012;4(21):48–56.
- Rao GS. Estimation of reliability in multicomponent stress-strength model based on Rayleigh distribution. ProbStat Forum. 2012;5(1):150–161.
- Rao GS, Kantam R, Rosaiah K, et al. Estimation of reliability in multicomponent stress-strength based on inverse Rayleigh distribution. J Stat Appl Probab. 2013;2(3):261–267. doi: 10.12785/jsap/020309
- Rao GS, Aslam M, Kundu D. Burr-XII distribution parametric estimation and estimation of reliability of multicomponent stress-strength. Commun Stat Theory Methods. 2015;44(23):4953–4961. doi: 10.1080/03610926.2013.821490
- Rao GS, Aslam M, Arif OH. Estimation of reliability in multicomponent stress–strength based on two parameter exponentiated Weibull distribution. Commun Stat Theory Methods. 2017;46(5):2396–2410. doi: 10.1080/03610926.2015.1044671
- Dey S, Mazucheli J, Anis M. Estimation of reliability of multicomponent stress-strength for a Kumaraswamy distribution. Commun Stat Theory Methods. 2017;46(4):1560–1572. doi: 10.1080/03610926.2015.1022457
- Jose JK, Drisya M, Manoharan M. Estimation of stress-strength reliability using discrete phase type distribution. Commun Stat Theory Methods. 2020;51(2):368–386. doi: 10.1080/03610926.2020.1749663
- Balakrishnan N, Aggarwala R. Progressive censoring: theory, methods, and applications. Boston: Birkhäuser; 2000.
- Balakrishnan N, Cramer E. The art of progressive censoring: applications to reliability and quality statistics for Industry and technology. New York: Springer; 2014.
- Kohansal A. On estimation of reliability in a multicomponent stress-strength model for a Kumaraswamy distribution based on progressively censored sample. Stat Pap. 2019;60(6):2185–2224. doi: 10.1007/s00362-017-0916-6
- Ahmadi K, Ghafouri S. Reliability estimation in a multicomponent stress-strength model under generalized half-normal distribution based on progressive type-II censoring. J Stat Comput Simul. 2019;89(13):2505–2548. doi: 10.1080/00949655.2019.1624750
- Maurya RK, Tripathi YM. Reliability estimation in a multicomponent stress-strength model for Burr XII distribution under progressive censoring. Braz. J. Probab. Stat. 2020;34(2):345–369. doi: 10.1214/18-BJPS426
- Mahto AK, Tripathi YM. Estimation of reliability in a multicomponent stress-strength model for inverted exponentiated Rayleigh distribution under progressive censoring. OPSEARCH. 2020;57(4):1043–1069. doi: 10.1007/s12597-020-00448-7
- Jha MK, Dey S, Tripathi YM. Reliability estimation in a multicomponent stress-strength based on unit-Gompertz distribution. Int J Qual Reliab Manag. 2019;37(3):428–450. doi: 10.1108/IJQRM-04-2019-0136
- Sauer L, Lio Y, Tsai T-R. Reliability inference for the multicomponent system based on progressively type II censored samples from generalized Pareto distributions. Mathematics. 2020;8(7):1176. doi: 10.3390/math8071176
- Saini S, Tomer S, Garg R. Inference of multicomponent stress-strength reliability following Topp-Leone distribution using progressively censored data. J Appl Stat. 2023;50(7):1538–1567. doi: 10.1080/02664763.2022.2032621
- Singh K, Mahto AK, Tripathi Y, et al. Inference for reliability in a multicomponent stress–strength model for a unit inverse Weibull distribution under type-II censoring. Qual Technol Quant Manag. 2023;0(0):1–31.
- Saini S, Garg R. Non-Bayesian and Bayesian estimation of stress-strength reliability from Topp-Leone distribution under progressive first-failure censoring. Int J Model Simul. 2022;44(1):1–15. doi: 10.1080/02286203.2022.2148878
- Ijaz M, Mashwani WK, Belhaouari SB. A novel family of lifetime distribution with applications to real and simulated data. PLoS ONE. 2020;15(10):1–15. doi: 10.1371/journal.pone.0238746
- Bourguignon M, Silva RB, Cordeiro GM. The Weibull-G family of probability distributions. J Data Sci. 2014;12(1):53–68. doi: 10.6339/JDS.201401_12(1).0004
- Lai C, Xie M, Murthy D. A modified Weibull distribution. IEEE Trans Reliab. 2003;52(1):33–37. doi: 10.1109/TR.2002.805788
- Cox DR, Hinkley DV. Theoretical statistics. London: Chapman and Hall; 1974.
- Arnold BC, Press SJ. Bayesian inference for Pareto populations. J Econom. 1983;21(3):287–306. doi: 10.1016/0304-4076(83)90047-7
- Nakagami M. The m-distribution—A general formula of intensity distribution of rapid fading. In: Hoffman WC, editor. Statistical methods in radio wave propagation. Pergamon Press; 1960. p. 3–36.
- Lindley DV. Approximate Bayesian methods. Trab De Estad Invest Oper. 1980;31(1):223–245. doi: 10.1007/BF02888353
- Chen M-H, Shao Q-M. Monte Carlo estimation of Bayesian credible and HPD intervals. J Comput Graph Stat. 1999;8(1):69–92.
- Cao JH, Cheng K. An introduction to reliability mathematics. Beijing: Science Press; 1986.
- Kizilaslan F, Nadar M. Estimation of reliability in a multicomponent stress-strength model based on a bivariate Kumaraswamy distribution. Stat Pap. 2018;59(1):307–340. doi: 10.1007/s00362-016-0765-8
- Gradshteyn I, Ryzhik I. Table of integrals, series, and products. 6th ed. New York: Academic Press; 1994.
- Nichols MD, Padgett W. A bootstrap control chart for Weibull percentiles. Qual Reliab Eng Int. 2006;22(2):141–151. doi: 10.1002/(ISSN)1099-1638
- Jha MK, Dey S, Alotaibi R, et al. Multicomponent stress-strength reliability estimation based on unit generalized exponential distribution. Ain Shams Eng J. 2022;13(5):101627. doi: 10.1016/j.asej.2021.10.022
- Mahdavi A, Kundu D. A new method for generating distributions with an application to exponential distribution. Commun Stat Theory Methods. 2017;46(13):6543–6557. doi: 10.1080/03610926.2015.1130839
- Mudholkar G, Srivastava D. Exponentiated Weibull family for analyzing bathtub failure-rate data. IEEE Trans Reliab. 1993;42(2):299–302. doi: 10.1109/24.229504
- Isa AM, Bashiru SO, Ali BA, et al. Sine-exponential distribution: its mathematical properties and application to real dataset. UMYU Scientifica. 2022;1(1):127–131. doi: 10.56919/usci.1122.017
- Oguntunde P, Adejumo A, Balogun O. Statistical properties of the exponentiated generalized inverted exponential distribution. Appl Math (Irvine). 2014;4(2):47–55.
- Nadar M, Papadopoulos A, Kizilaslan F. Statistical analysis for Kumaraswamy's distribution based on record data. Stat Pap. 2013;54(2):355–369. doi: 10.1007/s00362-012-0432-7