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|Title: ||Uniform strong convergence results for the conditional Kaplan-Meier estimator and its quantiles|
|Authors: ||VAN KEILEGOM, Ingrid|
|Keywords: ||Mathematical Statistics|
Non and semiparametric methods
|Issue Date: ||1996|
|Citation: ||Communications in Statistics A, 25(10). p. 2251-2265|
|Abstract: ||We consider a fixed design model in which the responses are possibly right censored. The aim of this paper is to establish some important almost sure convergence properties of the Kaplan-Meier type estimator for the lifetime distribution at a given covariate value. We also consider the corresponding quantile estimator and obtain a modulus of continuity result. Our rates of uniform strong convergence are obtained via exponential probability bounds.|
|Type: ||Journal Contribution|
|Appears in Collections: ||Research publications|
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