References
- Akinsete, A., Famoye, F., & Lee, C. (2012). The beta-Pareto distribution. Statistics 42(6), 547–563.
- Alshawarbeh, E., Lee, C., & Famoye, F. (2012). Beta-Cauchy distribution. Journal of Probability and Statistical Science, 10, 41–58.
- Alzaatreh, A., Lee., C., & Famoye, F. (2013a). A new method for generating families of continuous distributions. Metron, 71(1), 63–79.
- Alzaatreh, A., Famoye, F., & Lee, C. (2103b). Weibull-Pareto distribution and its applications. Communications in Statistics - Theory and Methods, 42(9), 1673–1691.
- Aljarrah, M. A., Lee, C. & Famoye, F. (2014). On generating T-X family of distributions using quantile functions. Journal of Statistical Distributions and Applications, 1(2), 1–17.
- Barreto-Souza, W., Santos, A. H. S., & Cordeiro, G. M. (2010) The beta generalized exponential distribution. Journal of Statistical Computation and Simulation, 80(2), 159–172.
- Block, H. W., Savits, T. H., & Singh, H. (1998). The reversed hazard rate function. Probability in the Engineering and Informational Sciences, 12(01), 69–90.
- Burr, I. W. (1942). Cumulative frequency functions. The Annals of Mathematical Statistics, 13, 215–232.
- Carrasco, J. M. F., Ortega, E. M. M., & Cordeiro, G. M. (2008). A generalized modified Weibull distribution for lifetime modeling. Computational Statistics and Data Analysis, 53, 450–462.
- Cordeiro, G. M., & de Castro, M. (2011) A new family of generalized distributions. Journal of Statistical Computation and Simulation, 81(7), 883–898.
- Cordeiro, G. M., Cristino, T., Hashimoto, E. M., & Ortega, E. M.(2013). The beta generalized Rayleigh distribution with applications to lifetime data. Statistical Papers, 54, 133–161.
- de Pascoa, M. A. R., Ortega, E. M. M., & Cordeiro, G. M. (2011). The Kumaraswamy generalized gamma distribution with application in survival analysis Statistical Methodology, 8, 411–433.
- Elderton, W. P. & Johnson, N. L.(1969) Systems of frequency curves. Cambridge University Press.
- Eugene, N., Lee, C., & Famoye, F.(2002). Beta-normal distribution and its applications. Communications in Statistics - Theory and Methods, 31(6), 497–512.
- Famoye, F., Lee, C., & Olumolade, O.(2005). The beta-Weibull distribution. Journal of Statistical Theory and Applications, 4(2):121-136.
- Johnson, N. L., Kotz, S., & Balakrishnan, N.(1994). Continuous univariate distributions. Vol. 1, John Wiley and Sons.
- Jones, M. C. (2009), Kumaraswamy’s distribution: A beta-type distribution with tractability advantages. Statistical Methodology, 6, 70–81.
- Lee, C., Famoye, F., & Alzaatreh, A. (2013). Methods for generating families of univariate continuous distributions in the recent decades. WIREs Computational Statistics, 5(3):219–238.
- Nadarajah, S., & Kotz, S. (2006) The beta exponential distribution. Reliability Engineering and System Safety, 91, 697.
- Khodabin, M., & Ahmadabadi, A. R. (2010). Some properties of generalized gamma distribution. Mathematical Sciences, 4(1), 9–28.
- Ramberg, J. S., & Schmeiser, B. W. (1974) An approximate method for generating asymmetric random variables. Communications of the Association for Computing Machinery, 17, 78–82.
- Ramberg, J. S., Tadikamalla, P. R., Dudewicz, E. J., Mykytka, E. F. (1979). A probability distribution and its uses in fitting data. Technometrics, 21, 201–214.
- Sengupta, D., & Nanda, A. K.(1999). Log-concave and concave distributions in reliability. Naval Research Logistics, 46(4), 419–433.
- Stacy, E. W. (1962). A generalization of the gamma distribution. The Annals of Mathematical Statistics, 33, 1187–1192.