Consider a heteroscedastic regression model $Y = m(X) +
\sigma(X)\varepsilon$, where the functions $m$ and $\sigma$ are
“smooth,” and $\varepsilon$ is independent of $X$. The response
variable $Y$ is subject to random censoring, but it is assumed that there
exists a region of the covariate $X$ where the censoring of $Y$ is
“light.” Under this condition, it is shown that the assumed
nonparametric regression model can be used to transfer tail information from
regions of light censoring to regions of heavy censoring. Crucial for this
transfer is the estimator of the distribution of $\varepsilon$ based on
nonparametric regression residuals, whose weak convergence is obtained. The
idea of transferrring tail information is applied to the estimation of the
conditional distribution of $Y$ given $X = x$ with information on the upper
tail “borrowed ” from the region of light censoring, and to the
estimation of the bivariate distribution $P(X \leq x, Y \leq y)$ with no
regions of undefined mass. The weak convergence of the two estimators is
obtained. By-products of this investigation include the uniform consistency of
the conditional Kaplan–Meier estimator and its derivative, the location
and scale estimators and the estimators of their derivatives.
@article{1017939150,
author = {Van Keilegom, Ingrid and Akritas, Michael G.},
title = {Transfer of tail information in censored regression
models},
journal = {Ann. Statist.},
volume = {27},
number = {4},
year = {1999},
pages = { 1745-1784},
language = {en},
url = {http://dml.mathdoc.fr/item/1017939150}
}
Van Keilegom, Ingrid; Akritas, Michael G. Transfer of tail information in censored regression
models. Ann. Statist., Tome 27 (1999) no. 4, pp. 1745-1784. http://gdmltest.u-ga.fr/item/1017939150/