References
- Aarset, M. V. 1987. How to identify bathtub hazard rate. IEEE Trans. Reliab. R-36:106–108.
- Almalki, S. J., and J. Yuan. 2013. The new modified Weibull distribution. Reliab. Eng. Syst. Saf. 111:164–170.
- Bain, L. J. 1974. Analysis for the linear failure-rate life-testing distribution. Technometrics 16:551–559.
- Bebbington, M., C. D. Lai, and R. Zitikis. 2007. A flexible Weibull extension. Reliab. Eng. Syst. Saf. 92:719–726.
- Carrasco, M., E. M. Ortega, and G. M. Cordeiro. 2008. A generalized modified Weibull distribution for lifetime modeling. Comput. Stat. Data Anal. 53:450–462.
- Cordeiro, G. M., E. M. Ortega, and S. Nadarajah. 2010. The Kumaraswamy Weibull distribution with application to failure data. J. Franklin Inst. 347:1399–1429.
- Cox, D. R., and D. Oakes. 1984. Analysis of survival data. Vol. 21, CRC Press.
- Famoye, F., C. Lee, and O. Olumolade. 2005. The beta-Weibull distribution. J. Stat. Theory Appl. 4:121–136.
- Hartless, G., and L. Leemis. 1996. Computational algebra applications in reliability theory. Reliab. IEEE Trans. 45 (3):393–399.
- Kies, J. A. 1958. The strength of glass. Naval Research Laboratory Report No. 5093. Washington D.C.
- Kumar, U., B. Klefsjö, and S. Granholm. 1989. Reliability investigation for a fleet of load haul dump machines in a Swedish mine. Reliab. Eng. Syst. Saf. 26:341–361.
- Kuo, W., and M. J. Zuo. 2001. Optimal Reliability Modeling: Principles and Applications. New York: John Wiley and Sons.
- Lai, C. D., D. N. P. Murthy, and M. Xie. 2011. Weibull distributions. Comput. Stat. 33:282–287.
- Lai, C. D., M. Xie, and D. N. P. Murthy. 2003. A modified Weibull distribution. IEEE Trans. Reliab. 52:33–37.
- Meeker, W. Q., and L. A. Escobar. 1998. Statistical Methods for Reliability Data. New York: John Wiley and Sons.
- Miller, R. G., G. Gong, and A. Muñoz. 1981. Survival Analysis. New York: John Wiley and Sons.
- Murthy, D. N. P., M. Xie, and R. Jiang. 2003. Weibull Models. New York: John Wiley and Sons.
- Nelson, W. 1990. Accelerated Testing: Statistical Models, Test Plans, and Data Analysis. New York: John Wiley and Sons.
- Perdoná, G. S. C. 2006. Modelos de Riscos Aplicados à Análise de Sobrevivência (in Portuguese). Doctoral Thesis. Institute of Computer Science and Mathematics, University of São Paulo, Brasil.
- Pham, H., and C. D. Lai. 2007. On recent generalizations of the Weibull distribution. IEEE Trans. Reliab. 56:454–458.
- Phani, K. K. 1987. A new modified Weibull distribution function. Commun. Am. Ceram. Soc. 70:182–184.
- Rajarshi, S., and M. B. Rajarshi. 1988. Bathtub distributions: A review. Commun. Stat. - Theory Methods 17:2597–2621.
- Sarhan, A. M., A. A. Abd El-Baset, and I. A. Alasbahi. 2013. Exponentiated generalized linear exponential distribution. Appl. Math. Model. 37:2838–2849.
- Sarhan, A. M., and J. Apaloo. 2013. Exponentiated modified Weibull extension distribution. Reliab. Eng. Syst. Saf. 112:137–144.
- Sarhan, A. M., and M. Zaindin. 2009. Modified Weibull distribution. Appl. Sci. 11:123–136.
- Silva, A. N. F. 2004. Estudo evolutivo das crianças expostas ao HIV e notificadas pelo núcleo de vigilância epidemiológica do HCFMRP-USP (in Portuguese). M.Sc. Thesis. University of São Paulo, Brasil.
- Silva, G. O., E. M. Ortega, and G. M. Cordeiro. 2010. The beta modified Weibull distribution. Lifetime Data Anal. 16:409–430.
- Singla, N., K. Jain, and S. Kumar Sharma. 2012. The beta generalized Weibull distribution: Properties and applications. Reliab. Eng. Syst. Saf. 102:5–15.
- Weibull, W. A. 1951. Statistical distribution function of wide applicability. J. Appl. Mech. 18:293–296.
- Xie, M., and C. D. Lai. 1995. Reliability analysis using an additive Weibull model with bathtub-shaped failure rate function. Reliab. Eng. Syst. Saf. 52:87–93.
- Xie, M., Y. Tang, and T. N. Goh. 2002. A modified Weibull extension with bathtub-shaped failure rate function. Reliab. Eng. Syst. Saf. 76:279–285.