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The Kaplan-Meier Estimator as an Inverse-Probability-of-Censoring Weighted Average

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  • Satten G. A.
  • Datta S.

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  • Satten G. A. & Datta S., 2001. "The Kaplan-Meier Estimator as an Inverse-Probability-of-Censoring Weighted Average," The American Statistician, American Statistical Association, vol. 55, pages 207-210, August.
    • Handle: RePEc:bes:amstat:v:55:y:2001:m:august:p:207-210
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    Cited by:

    1. Alan D. Hutson, 2016. "Nonparametric rank based estimation of bivariate densities given censored data conditional on marginal probabilities," Journal of Statistical Distributions and Applications, Springer, vol. 3(1), pages 1-14, December.
    2. Yu-Ye Zou & Han-Ying Liang, 2020. "CLT for integrated square error of density estimators with censoring indicators missing at random," Statistical Papers, Springer, vol. 61(6), pages 2685-2714, December.
    3. García, A., 2016. "Oaxaca-Blinder Type Counterfactual Decomposition Methods for Duration Outcomes," Documentos de Trabajo 14186, Universidad del Rosario.
    4. Pao-sheng Shen, 2010. "Nonparametric estimation of the bivariate survival function for one modified form of doubly censored data," Computational Statistics, Springer, vol. 25(2), pages 203-213, June.
    5. Olivier Lopez & Xavier Milhaud & Pierre-Emmanuel Thérond, 2016. "Tree-based censored regression with applications in insurance," Post-Print hal-01364437, HAL.
    6. Shen, Pao-sheng, 2009. "An inverse-probability-weighted approach to the estimation of distribution function with doubly censored data," Statistics & Probability Letters, Elsevier, vol. 79(9), pages 1269-1276, May.
    7. Olivier Lopez, 2007. "On the Estimation of the Joint Distribution in Regression Models with Censored Responses," Working Papers 2007-11, Center for Research in Economics and Statistics.

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