References
- Agresti, A., and B. A. Coull. 1998. Approximate is better than “exact” for interval estimation of binomial proportions. Am. Stat., 52, 119–126.
- Brown, L. D., T. T. Cai, and A. DasGupta. 2001. Interval estimation for a binomial proportion. Stat. Sci., 16, 101–133.
- Cheng, K. F., and C. K. Chu. 2004. Semiparametric density estimation under a two-sample density ratio model. Bernoulli, 10(4), 583–604.
- Efron, B., and R. Tibshirani. 1996. Using specially designed exponential families for density estimation. Ann. Stat., 24, 2431–2461.
- Fokianos, K. 2004. Merging information for semiparametric density estimation. J. R. Stat. Soc. Ser. B, 66, 941–958.
- Fokianos, K., and I. Kaimi. 2006. On the effect of misspecifying the density ratio model. Ann. Inst. Stat. Math., 58, 475–497.
- Fokianos, K., B. Kedem, J. Qin, and D. Short. 2001. A semiparametric approach to the one-way layout. Technometrics, 43, 56–65.
- Fokianos, K., and J. Qin. 2008. A note on Monte Carlo maximization by the density ratio model. J. Stat. Theory Pract., 2, 355–367.
- Gelman, A., J. B. Carlin, H. S. Stern, and D. B. Rubin. 2008. Bayesian data analysis, 2nd ed. New York, NY: Chapman and Hall/CRC.
- Gilbert, P. B. 2000. Large sample theory of maximum likelihood estimates in semiparametric biased sampling models. Ann. Stat., 28, 151–194.
- Gilbert, P. B., S. R. Lele, and Y. Vardi. 1999. Maximum likelihood estimation in semiparametric selection bias models with application to AIDS vaccine trials. Biometrika, 86, 27–43.
- Kedem, B., and R. Gagnon. 2010. Semiparametric distribution forecasting. J. Stat. Plan. Inference, 140, 3734–3741.
- Kedem, B., D. Wolff, and K. Fokianos. 2004. Statistical comparison of algorithms, IEEE Trans. Instrumentation Measure., 53, 770–776.
- Kedem, B., G. Lu, R. Wei, and P. D. Williams. 2008. Forecasting mortality rates via density ratio modeling. Can. J. Stat., 36, 193–206.
- Kedem, B., E.-Y. Kim, A. Voulgaraki, and B. I. Graubard. 2009. Two-dimensional semiparametric density ratio modeling of testicular germ cell data. Stat. Med., 28, 2147–2159.
- Lu, G. 2007. Asymptotic theory for multiple-sample semiparametric density ratio models and its application to mortality forecasting. PhD dissertation, Department of Mathematics, University of Maryland, College Park, MD.
- Qin, J., and B. Zhang. 1997. A goodness of fit test for logistic regression models based on case-control data. Biometrika, 84, 609–618.
- Qin, J., and B. Zhang. 2005. Density estimation under a two-sample semiparametric model. Nonparametric Stat., 17, 665–683.
- Vardi, Y. 1982. Nonparametric estimation in the presence of length bias. Ann. Stat., 10, 616–620.
- Vardi, Y. 1985. Empirical distribution in selection bias models. Ann. Stat., 13, 178–203.
- Venables, W. N., and B. D. Ripley. 2002. Modern applied statistics with S, 4th ed. New York, NY: Springer.
- Voulgaraki, A., B. Kedem, and B. I. Graubard. 2012. Semiparametric regression in testicular germ cell data. Ann. Appl. Stat., 6, 1185–1208.
- Zhang, B. 2000. A goodness of fit test for multiplicative-intercept risk models based on case-control data. Stat. Sin., 10, 839–865.