Sen, Arusharka and Stute, Winfried (2007) A Bi-Variate Kaplan-Meier Estimator Via An Integral Equation. Technical Report. Concordia University. Department of Mathematics & Statistics, Montreal, Quebec.
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| Divisions: | Concordia University > Faculty of Arts and Science > Mathematics and Statistics |
|---|---|
| Item Type: | Monograph (Technical Report) |
| Authors: | Sen, Arusharka and Stute, Winfried |
| Series Name: | Department of Mathematics & Statistics. Technical Report No. 3/07 |
| Corporate Authors: | Concordia University. Department of Mathematics & Statistics |
| Institution: | Concordia University |
| Date: | October 2007 |
| ID Code: | 6683 |
| Deposited By: | DIANE MICHAUD |
| Deposited On: | 03 Jun 2010 20:43 |
| Last Modified: | 18 Jan 2018 17:29 |
References:
Dabrowska, D.M. (1988). Kaplan-Meier estimate on the plane. Ann. Statist. 16, 1475-1489.Gill, R.D., van der Laan, M.J. and Wellner, J.A. (1995). Inefficient estimators of the bivariate survival function for three models. Ann. Inst. H. Poincar Probab. Statist. 31, 545-597.
Prentice, R.L., Moodie, F. and Wu, J. (2004). Hazard-based nonparametric survivor function estimation. J. R. Stat. Soc. Ser. B Stat. Methodol. 66, 305-319.
Stute, W. (1995). The central limit theorem under random censorship. Ann. Statist. 23, 422-439.
van der Laan, M.J. (1996). Efficient estimation in the bivariate censoring model and repairing NPMLE. Ann. Statist. 24, 596-627.
van der Vaart, A. (1991). On differentiable functionals. Ann. Statist. 19, 178-204.
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