https://orcid.org/0000-0001-8801-0219
References
- A.Z. Afify, M.A. Gemeay, and A. Ibrahim, The heavy-tailed exponential distribution: Risk measures, estimation, and application to actuarial data, Mathematics 8 (2020), p. 1276. doi:10.3390/math8081276
- A.Z. Afify and O.A. Mohamed, A new three-parameter exponential distribution with variable shapes for the hazard rate: Estimation and applications, Mathematics 8 (2020), pp. 1–17.
- A. Alizadeh, F.M. Bagheri, M. Alizadeh, and S. Nadarajah, A new four-parameter lifetime distribution, J. Appl. Stat. 44 (2017), pp. 767–797.
- H. Al-Mofleh, A.Z. Afify, and A. Ibrahim, A new extended two-parameter distribution: Properties, estimation methods, and applications in medicine and geology, Mathematics 8 (2020), p. 1578.
- S. Anatolyev and G. Kosenok, An alternative to maximum likelihood based on spacings, Econom. Theory 21 (2005), pp. 472–476.
- S.F. Bagheri, E.B. Samani, and M. Ganjali, The generalized modified Weibull power series distribution: Theory and applications, Comput. Statist. Data Anal. 94 (2016), pp. 136–160.
- S. Basu, S.K. Singh, and U. Singh, Parameter estimation of inverse Lindley distribution for Type-I censored data, Comput. Stat. 32 (2017), pp. 367–385.
- S. Basu, S.K. Singh, and U. Singh, Estimation of inverse Lindley distribution using product of spacings function for hybrid censored data, Methodol. Comput. Appl. Probab. 21 (2019), pp. 1377–1394.
- M. Chahkandi and M. Ganjali, On some lifetime distributions with decreasing failure rate, Comput. Stat. Data Anal. 53 (2009), pp. 4433–4440.
- R.C.H. Cheng and N.A.K. Amin, Maximum product of spacings estimation with application to the lognormal distribution, Math. Report, 791, 1979.
- R.C.H. Cheng and N.A.K. Amin, Estimating parameters in continuous univariate distributions with a shifted origin, J. R. Stat. Soc. B 42 (1983), pp. 394–403.
- S. Dey, S. Ali, and D. Kumar, Weighted inverted Weibull distribution: Properties and estimation, J. Stat. Manag. Syst. 23 (2020), pp. 843–885.
- I. Elbatal, E. Altun, A.Z. Afify, and G. Ozel, The generalized Burr XII power series distributions with properties and applications, Ann. Data Sci. 6 (2019), pp. 571–597.
- M. Ghitany, B. Atieh, and S. Nadarajah, Lindley distribution and its application, Math. Comput. Simul. 78 (2008), pp. 493–506.
- W. Gui and L. Guo, The complementary Lindley-geometric distribution and its application in lifetime analysis, Sankhya 79–B (2017), pp. 316–335.
- N.L. Johnson, A.W. Kemp, and S. Kotz, Univariate Discrete Distributions, John Wiley and Sons, New York, 2005.
- J.P. Klein and M.L. Moeschberger, Survival Analysis: Techniques for Censored and Truncated Data, Springer-Verlag, New York, 2003.
- D. Kumar, M. Nassar, A.Z. Afify, and S. Dey, The complementary exponentiated Lomax-Poisson distribution with applications to bladder cancer and failure data, Austrian J. Stat. 50 (2021), pp. 77–105.
- E.L. Lehmann, The power of rank tests, Ann. Math. Stat. 24 (1953), pp. 23–43.
- F. Louzada, M. Romana, and V.G. Cancho, The complementary exponential geometric distribution: Model, properties, and a comparison with its counterpart, Comput. Stat. Data Anal. 55 (2011), pp. 2516–2524.
- A.L. Moraisa and W. Barreto-Souz, A compound class of Weibull and power series distributions, Comput. Stat. Data Anal. 55 (2011), pp. 1410–1425.
- K.M. Mullen, D. Ardia, D. Gil, D. Windover, and J. Cline, DEoptim: An R package for global optimization by differential evolution, J. Stat. Softw. 40 (2011), pp. 1–26.
- D.N.P. Murthy, M. Xie, and R. Jiang, Weibull Models, John and Wiley, New York, 2004.
- A. Nasir, H.M. Yousof, F. Jamal, and M. Korkmaz, The exponentiated Burr XII power series distribution: Properties and applications, Stats 2 (2019), pp. 15–31.
- M. Nassar, A.Z. Afify, S. Dey, and D. Kumar, A new extension of Weibull distribution: Properties and different methods of estimation, J. Comput. Appl. Math. 336 (2018), pp. 439–457.
- M. Nassar, A.Z. Afify, and M.K. Shakhatreh, Estimation methods of alpha power exponential distribution with applications to engineering and medical data, Pak. J. Stat. Oper. Res. 16 (2020), pp. 149–166.
- M. Nassar, A.Z. Afify, M.K. Shakhatreh, and S. Dey, On a new extension of Weibull distribution: Properties, estimation, and applications to one and two causes of failures, Qual. Reliab. Eng. Int. 36 (2020), pp. 2019–2043.
- A. Noack, A class of random variables with discrete distributions, Ann. Math. Stat. 21 (1950), pp. 127–132.
- K.V. Price, R.M. Storn, and A.J. Lampinen, Differential Evolution – A Practical Approach to Global Optimization, Springer-Verlag, Berlin, 2006.
- R Core Team, A Language and Environment for Statistical Computing, R Foundation for Statistical Computing, Vienna, 2016.
- M.W.A. Ramos, A. Percontini, G.M. Cordeiro, and R.V. da Silva, The Burr XII negative binomial distribution with applications to lifetime data, Int. J. Stat. Probab. 4 (2015), pp. 109–125.
- M.K. Shakhatreh, A new three-parameter extension of the log-logistic distribution with applications to survival data, Commun. Stat. Theory Methods 47 (2018), pp. 5205–5226.
- M.K. Shakhatreh, A.J. Lemonte, and G.M. Cordeiro, On the generalized extended exponential-Weibull distribution: Properties and different methods of estimation, Int. J. Comput. Math. 97 (2020), pp. 1029–1057.
- V.K. Sharma, S.K. Singh, U. Singh, and V. Agiwal, The inverse Lindley distribution: A stress-strength reliability model with application to head and neck cancer data, J. Ind. Prod. Eng. 32 (2015), pp. 162–173.
- R.B. Silva, M. Bourguignon, C.R.B. Dias, and G.M. Gauss, The compound class of extended Weibull power series distributions, Comput. Stat. Data Anal. 58 (2013), pp. 352–367.
- R.B. Silva and G.M. Cordeiro, The Burr XII power series distributions: A new compounding family, Braz. J. Probab. Stat. 29 (2015), pp. 565–589.
- J. Swain, S. Venkatraman, and J. Wilson, Least squares estimation of distribution function in Johnson's translation system, J. Stat. Comput. Simul. 29 (1988), pp. 271–297.
- R. Tahmasbi and S Rezaei, A two-parameter lifetime distribution with decreasing failure rate, Comput. Stat. Data Anal. 52 (2008), pp. 3889–3901.
- C. Tojeiro, F. Louzada, M. Romana, and P. Borges, The complementary Weibull geometric distribution, J. Stat. Comput. Simul., 84 (2014), pp. 1345–1362.
- M. Warahena-Liyanage and G. Pararai, The Lindley power series class of distributions: Model, properties and applications, J. Comput. Model. 5 (2015), pp. 35–80.