Inefficient estimators of the bivariate survival function for three models

Richard D. Gill; Mark J. van der Laan; Jon A. Wellner

Annales de l'I.H.P. Probabilités et statistiques (1995)

  • Volume: 31, Issue: 3, page 545-597
  • ISSN: 0246-0203

How to cite

top

Gill, Richard D., Laan, Mark J. van der, and Wellner, Jon A.. "Inefficient estimators of the bivariate survival function for three models." Annales de l'I.H.P. Probabilités et statistiques 31.3 (1995): 545-597. <http://eudml.org/doc/77521>.

@article{Gill1995,
author = {Gill, Richard D., Laan, Mark J. van der, Wellner, Jon A.},
journal = {Annales de l'I.H.P. Probabilités et statistiques},
keywords = {compact differentiability; bootstrap; bivariate survival functions; functional delta-method; Gaussian process; efficiency; bivariate censoring model; independence},
language = {eng},
number = {3},
pages = {545-597},
publisher = {Gauthier-Villars},
title = {Inefficient estimators of the bivariate survival function for three models},
url = {http://eudml.org/doc/77521},
volume = {31},
year = {1995},
}

TY - JOUR
AU - Gill, Richard D.
AU - Laan, Mark J. van der
AU - Wellner, Jon A.
TI - Inefficient estimators of the bivariate survival function for three models
JO - Annales de l'I.H.P. Probabilités et statistiques
PY - 1995
PB - Gauthier-Villars
VL - 31
IS - 3
SP - 545
EP - 597
LA - eng
KW - compact differentiability; bootstrap; bivariate survival functions; functional delta-method; Gaussian process; efficiency; bivariate censoring model; independence
UR - http://eudml.org/doc/77521
ER -

References

top
  1. P.K. Andersen, Ø. Borgan, R.D. Gill and N. Keiding, Statistical Models Based on Counting Processes, Springer-Verlag, New York, 1992. Zbl0824.60003
  2. D.M. Bakker, Two nonparametric estimators of the survival function of bivariate right censored observations, Report BS-R9035, Centre for mathematics and computer science, Amsterdam, 1990. 
  3. P.J. Bickel, Y. Ritov and J.A. Wellner, Efficient estimation of linear functionals of a probability measure P with known marginal distributions, Ann. Statist., Vol. 19, 1991, pp. 1316-1346. Zbl0742.62034MR1126327
  4. P.J. Bickel, C.A.J. Klaassen, Y. Ritov and J.A. Wellner, Efficient and Adaptive Estimation for Semiparametric Models, John Hopkins University Press, 1993. Zbl0786.62001MR1245941
  5. M.D. Burke, Estimation of a bivariate survival function under random censorship, Biometrika, Vol. 75, 1988, pp. 379-382. Zbl0641.62028MR946057
  6. D.M. Dabrowska, Kaplan Meier Estimate on the Plane, Ann. Statist., Vol. 16, 1988, pp. 1475-1489. Zbl0653.62071MR964934
  7. D.M. Dabrowska, Kaplan Meier Estimate on the Plane: Weak Convergence, LIL, and the Bootstrap, J. Multivar. Anal., Vol. 29, 1989, pp. 308-325. Zbl0667.62025MR1004341
  8. R.M. Dudley, Weak convergence of probabilities on nonseparable metric spaces, and empirical measures on Euclidean spaces, Illinois J. Math., Vol. 10, 1966, pp. 109-126. Zbl0178.52502MR185641
  9. R.M. Dudley, Fréchet differentiability, p-variation and universal Donsker classes. Ann. Prob. Vol. 20, 1991, pp. 1968-1983. Zbl0778.60026MR1188050
  10. R.M. Dudley, Empirical processes, p-variation for p ≤ 2 and the quantile and ∫ FdG operator, unpublished manuscript 1992. 
  11. R.D. Gill, Non- and Semi-parametric Maximum Likelihood Estimators and the von Mises Method (Part 1), Scand. J. Statist., Vol. 16, 1989, pp. 97-128. Zbl0688.62026MR1028971
  12. R.D. Gill and S. Johansen, A survey of product integration with a view towards application in survival analysis, Ann. Statist., Vol. 18, 1990, pp. 1501-1555. Zbl0718.60087MR1074422
  13. R.D. Gill, Multivariate survival analysis, Theory Prob. Appl., Vol. 37, 1992, pp. 18-31 and 307-328 (in Russian; English translation to appear). Zbl0780.62086
  14. E. Giné and J. Zinn, Bootstrapping general empirical measures, Ann. Probability, Vol. 18, 1990, pp. 284-301. Zbl0706.62017MR1055437
  15. J. Hoffmann-Jørgensen, Stochastic Processes on Polish Spaces, unpublished manuscript, 1984. 
  16. L.V. Kantorovich and G.P. Akilov, Functional Analysis, translated by Howard L. Silcock, New York, Permagon Press, 1982. Zbl0484.46003MR664597
  17. M.J. van der Laan, Dabrowska's multivariate product limit estimator and the delta-method, Master's Thesis, Dept. of Math., Utrecht Univ., 1990. 
  18. M.J. van der Laan, Analysis of Pruitt's estimator of the bivariate survival function, preprint No. 648, Dept of Math., Utrecht Univ., 1991. 
  19. M.J. van der Laan, Efficient Estimator of the Bivariate Survival Function for Right Censored Data, Technical Report No. 337, Department of Statistics, University of California, Berkeley, 1992. 
  20. M. Loève, Probability Theory, van Nostrand, New York, 1955. Zbl0066.10903MR203748
  21. G. Neuhaus, On weak convergence of stochastic processes with multidimensional time parameter, Ann. Math. Statist., Vol. 42, 1971, pp. 1285-1295. Zbl0222.60013MR293706
  22. D. Pollard, Convergence of Stochastic Processes, Springer-Verlag, New York, 1984. Zbl0544.60045MR762984
  23. R.L. Prentice and J. Cai, Covariance and survivor function estimation using censored multivariate failure time data, Biometrika, Vol. 79, 1992a, pp. 495-512. Zbl0764.62095MR1187604
  24. R.L. Prentice and J. Cai, Marginal and conditional models for the analysis of multivariate failure time data. Klein J. P. and Goel P. K., Eds., Survival Analysis State of the Art, Kluwer, Dordrecht, 1992b. Zbl0850.62846
  25. R.C. Pruitt, On negative mass assigned by the bivariate Kaplan-Meier estimator, Ann. Stat., Vol. 19, 1991a, pp. 443-453. Zbl0738.62049MR1091861
  26. R.C. Pruitt, Small sample comparisons of five bivariate survival curve estimators, Technical Report No. 559, University of Minnesota, 1991a. 
  27. R.C. Pruitt, Strong consistency of self-consistent estimators: general theory and an application to bivariate survival analysis, Technical Report No. 543, University of Minnesota, 1991b. 
  28. J.A. Reeds, On the definition of von Mises functionals, Ph. D. thesis, Dept. of Statistics, Harvard University, Research Report S-44, 1976. 
  29. A. Sheehy and J.A. Wellner, Uniformity in P of some limit theorems for empirical measures and processes, Technical Report No. 134, Dept. of Statistics, Univ. of Washington, 1988. 
  30. A. Sheehy and J.A. Wellner, Uniform Donsker Classes of Functions, Ann. Probability, Vol. 20, 1992, pp. 1983-2030. Zbl0763.60012MR1188051
  31. G.R. Shorack and J.A. Wellner, Empirical Processes. Wiley, New York, 1986. MR838963
  32. A.W. van der Vaart and J.A. Wellner, Prohorov and continuous mapping theorems in the Hoffmann-Jørgensen weak convergence theory, with application to convolution and asymptotic minimax theorems, Tech. Report No. 157. Dept. of Statistics, University of Washington, Seattle, 1989. 
  33. A.W. van der Vaart and J.A. Wellner, Weak Convergence and Empirical Processes, Springer Verlag, New York, to appear 1995. Zbl0862.60002MR1385671
  34. J.A. Wellner, Covariance formulas via marginal martingales, Statistica Neerlandica, Vol. 48, 1994. Zbl0829.62097MR1310337

NotesEmbed ?

top

You must be logged in to post comments.

To embed these notes on your page include the following JavaScript code on your page where you want the notes to appear.

Only the controls for the widget will be shown in your chosen language. Notes will be shown in their authored language.

Tells the widget how many notes to show per page. You can cycle through additional notes using the next and previous controls.

    
                

                
Note: Best practice suggests putting the JavaScript code just before the closing </body> tag.