References
- Alexander, C., G. M. Cordeiro, E. M. M. Ortega, and J. M. Sarabia. 2012. Generalized beta-generated distribution. Computational Statistics and Data Analysis, 56, 1880–1897.
- Barreto-Souza, W., A. H. S. Santos, and G. M. Cordeiro. 2010. The beta generalized exponential distribution. J. Stat. Comput. Simulation, 80, 159–172.
- Balakrishnan, N., V. Leiva, A. Sanhueza, and E. Cabrea. 2009. Mixture inverse Gaussian distributions and its transformations, moments and applications. Statistics, 43, 91–104.
- Cheng, J., C. Tellambura, and N. Beaulieu. 2003. Performance analysis of digital modulations on Weibull fading channels. IEEE Vehicular Technology Conference—Fall, Orlando, FL, 1, 236–240.
- Cordeiro, G. M., and M. de Castro. 2011. A new family of generalized distributions. Journal of Statistical Computation and Simulation, 81, 883–898.
- Cordeiro, G. M., S. Nadarajah, and E. M. M. Ortega. 2012. General results for the beta Weibull distribution. J. Stat. Comput. Simulation. doi:doi:10.1080/00949655.2011.649756
- Cordeiro, G. M., E. M. M. Ortega, and S. Nadarajah. 2010. The Kumaraswamy Weibull distribution with application to failure data. J. Franklin Inst., 347, 1399–1429.
- Cowles, M. K., and B. P. Carlin. 1996. Markov chain Monte Carlo convergence diagnostics: a comparative review. J. Am. Stat. Assoc., 91, 133–169.
- Eugene, N., C. Lee, and F. Famoye. 2002. Beta-normal distribution and its applications. Commun. Stat. Theory Methods, 31, 497–512.
- Gelman, A., and D. B. Rubin. 1992. Inference from iterative simulation using multiple sequences (with discussion). Stat. Sci., 7, 457–472.
- Gradshteyn, I. S., and I. M. Ryzhik. 2000. Table of integrals, series, and products, 6th ed. San Diego, CA: Academic Press.
- Gupta, R. D., and D. Kundu. 1999. Generalized exponential distributions. Austr. NZ J. Stat., 41, 173–188.
- Gupta, R. D., and D. Kundu. 2001. Exponentiated exponential family: an alternative to gamma and Weibull distributions. Biometrical J., 43, 117–130.
- Gupta, R. C., R. D. Gupta, and P. L. Gupta. 1998. Modeling failure time data by Lehman alternatives. Commun. Stat. Theory Methods, 27, 887–904.
- Hao, Z., and V. P. Singh. 2008. Entropy-based parameter estimation for extended Burr XII distribution. Stochastic Environ. Res. Risk Assess., 23, 1113–1122.
- Jones, M. C. 2004. Family of distributions arising from distribution of order statistics. Test, 13, 1–43.
- Kenney, J. F., and E. S. Keeping. 1962. Mathematics of statistics, 3rd ed. Princenton, NJ: Van Nostrand.
- McDonald, J. B. 1984. Some generalized functions for the size distributions of income. Econometrica, 52, 647–663.
- Moors, J. J. A. 1988. A quantile alternative for kurtosis. J. R. Stat. Society Ser. D, 37, 25–32.
- Mudholkar, G. S., and D. K. Srivastava. 1993. Exponentiated Weibull family for analyzing bathtub failure-rate data. IEEE Trans. Reliability, 42, 299–302.
- Mudholkar, G. S., D. K. Srivastava, and M. Freimer. 1995. The exponentiated Weibull family: A reanalysis of the bus-motor-failure data. Technometrics, 37, 436–445.
- Mudholkar, G. S., D. K. Srivastava, and G. D. Kollia. 1996. A generalization of the Weibull distribution with application to the analysis of survival data. J. Am. Stat. Assoc., 91, 1575–1583.
- Nadarajah, S. 2011. The exponentiated exponential distribution: a survey. AStA Adv. Stat. Anal., 95, 219–251.
- Nadarajah, S., and A. K. Gupta. 2007. The exponentiated gamma distribution with application to drought data. Calcutta Stat. Assoc. Bull., 59, 29–54.
- Nadarajah, S., and S. Kotz. 2006. The beta exponential distribution. Reliability Eng. System Safety, 91, 689–697.
- Nadarajah, S., and S. Kotz. 2007. On some recent modifications of Weibull distribution. IEEE Trans. Reliability, 54, 561–562.
- Prudnikov, A. P., Y. A. Brychkov, and O. I. Marichev. 1986. Integrals and series, vol. 1, 2, and 3. Amsterdam, The Netherlands: Gordon and Breach Science.
- Shao, Q., H. Wong, J. Xia, and I. Wai-Cheung. 2004. Models for extremes using the extended three-parameter Burr XII system with application to flood frequency analysis. Hydrol. Sci. J., 49, 685–702.