References
- Bemis, B., L. J. Bain, and J. J. Higgins. 1972. Estimation and hypothesis testing for the parameters of a bivariate exponential distribution. Journal of the American Statistical Association 67:927–29.
- Berger, J. M., and D. O. Sun. 1993. Bayesian analysis for the poly-Weibull distribution. Journal of the American Statistical Association 88:1412–8.
- Byrd, R. H., P. Lu, J. Nocedal, and C. Zhu. 1995. A limited memory algorithm for bound constrained optimization. SIAM Journal on Scientific Computing 16:1190–208.
- Chen, P., A. C. Xu, and Z. S. Ye. 2016. Generalized fiducial inference for accelerated life tests with Weibull distribution and progressively type-II censoring. IEEE Transactions on Reliability 65(4):1737–44.
- Davison, A. C., and F. Louzada-Neto. 2000. Inference for the poly-Weibull models. Statistician 49:189–96.
- Feizjavadian, S. H., and R. Hashemi. 2015. Analysis of dependent competing risks in the presence of progressive hybrid censoring using Marshall–Olkin bivariate Weibull distribution. Computational Statistics and Data Analysis 82:19–34.
- Fisher, R. A. 1930. Inverse probability. Proceedings of the Cambridge Philosophical Society xxvi:528–35.
- Gilks, W. R., and P. Wild. 1992. Adaptive rejection sampling for Gibbs samlping. Applied Statistics 41:337–48.
- Guan, Q., Y. C. Tang, and A. C. Xu. 2013. Objective Bayesian analysis for bivariate Marshall–Olkin exponential distribution. Computational Statistics and Data Analysis 64:299–313.
- Hannig, J. 2009. On generalized fiducial inference. Statistica Sinica 19:491–544.
- Hannig, J. 2013. Generalized fiducial inference via discretization. Statistica Sinica 23:489–514.
- Hannig, J., H. K. Iyer, and P. Patterson. 2006. Fiducial generalized confidence intervals. Journal of the American Statistical Association 101:254–69.
- Kotz, S., N. Balakrishnan, and N. L. Johnson. 2000. Continuous Multivariate Distributions, Models and Applications. New York: John Wiley and Sons.
- Kozumi, H. 2004. Posterior analysis of latent competing risk models by parallel tempering. Computational Statistics and Data Analysis 46:441–58.
- Kundu, D., and S. Basu. 2000. Analysis of incomplete data in the presence of competing risks. Journal of Statistical Planning and Inference 87:221–39.
- Kundu, D., and A. K. Dey. 2009. Estimating the parameters of the Marshall–Olkin bivariate Weibull distribution by EM algorithm. Computational Statistics and Data Analysis 53:956–65.
- Kundu, D., and A. K. Gupta. 2013. Bayes estimation for the Marshall–Olkin bivariate Weibull distribution. Computational Statistics and Data Analysis 57:271–81.
- Li, Y., J. G. Sun, and S. G. Song. 2012. Statistical analysis of bivariate failure time data with Marshall–Olkin Weibull models. Computational Statistics and Data Analysis 56:2041–50.
- Lu, J. C. 1992. Bayes parameter estimation for the bivariate Weibull model of Marshall–Olkin for censored data. IEEE Transactions on Reliability 41:608–15.
- Marshall, A. W., and I. Olkin. 1967. A multivariate exponential distribution. Journal of the American Statistical Association 62:30–44.
- Mazucheli, J., and J. A. Achcar. 2011. The Lindley distribution applied to competing risks lifetime data. Computer methods and programs in biomedicine 104:188–92.
- Meintanis, S. G. 2007. Test of fit for Marshall–Olkin distributions with applications. Journal of Statistical Planning and Inference 137:3954–63.
- Miyakawa, M. 1984. Analysis of incomplete data in competing risks model. IEEE Transactions on Reliability 33(4):293–96.
- Pareek, B., D. Kundu, and S. Kumar. 2009. On progressively censored competing risks data for Weibull distributions. Computational Statistics and Data Analysis 53:4083–94.
- Pena, E. A., and A. K. Gupta. 1990. Bayes estimation for the Marshall–Olkin exponential distribution. Journal of the Royal Statiscal Society. Series B. Methodology 52:379–89.
- Sarhan, A. M., D. C. Hamilton, and B. Smith. 2010. Statistical analysis of competing risks models. Reliability Engineering and System Safety 95:953–62.
- Wada, C. Y., P. K. Sen, and S. E. Shimakura. 1996. A bivariate exponential model with covariates in competing risks data. Calcutta Statistical Association Bulletin 46:197–210.
- Wandler, D. V., and J. Hannig. 2012. Generalized fiducial confidence intervals for extremes. Extremes 15:67–87.
- Wang, C. M., J. Hannig, and H. K. Iyer. 2012. Fiducial prediction intervals. Journal of Statistical Planning and Inference 142:1980–90.
- Wang, C. P., and M. Ghosh. 2003. Bayesian analysis of bivariate competing risks models with covariates. Journal of Statistical Planning and Inference 115:441–59.
- Weeranhandi, S. 1993. Generalized confidence intervals. Journal of the American Statistical Association 88:899–905.
- Xu, A. C., S. Basu, and Y. C. Tang. 2014. A full Bayesian approach for masked data in step-stress accelerated life testing. IEEE Transactions on Reliability 63:798–806.
- Xu, A. C., and Y. C. Tang. 2011. Objective bayesian analysis of accelerated competing failure models under type-I censoring. Computational Statistics and Data Analysis 55:2830–39.
- Xu, A. C., S. R. Zhou. 2017. Bayesian analysis of series system with dependent causes of failure. Statistical Theory and Related Fields 1(1):128–40.