English

Estimation of conditional cumulative distribution function from current status data

Statistics Theory 2013-04-11 v2 Statistics Theory

Abstract

Consider a positive random variable of interest Y depending on a covariate X, and a random observation time T independent of Y given X. Assume that the only knowledge available about Y is its current status at time T: \delta = 1_{Y \leq T}. This paper presents a procedure to estimate the conditional cumulative distribution function F of Y given X from an independent identically distributed sample of (X,T,\delta). A collection of finite-dimensional linear subsets of L^2(R^2) called models are built as tensor products of classical approximation spaces of L^2(R). Then a collection of estimators of F is constructed by minimization of a regression-type contrast on each model and a data driven procedure allows to choose an estimator among the collection. We show that the selected estimator converges as fast as the best estimator in the collection up to a multiplicative constant and is minimax over anisotropic Besov balls. Finally simulation results illustrate the performance of the estimation and underline parameters that impact the estimation accuracy.

Keywords

Cite

@article{arxiv.1110.5927,
  title  = {Estimation of conditional cumulative distribution function from current status data},
  author = {Sandra Plancade},
  journal= {arXiv preprint arXiv:1110.5927},
  year   = {2013}
}

Comments

27 pages, 22 figures

R2 v1 2026-06-21T19:26:27.951Z