Nonparametric Estimation of the Regression Function in an Errors-in-Variables Model
Abstract
We consider the regression model with errors-in-variables where we observe i.i.d. copies of satisfying , involving independent and unobserved random variables . The density of is unknown, whereas the density of is completely known. Using the observations , , we propose an estimator of the regression function , built as the ratio of two penalized minimum contrast estimators of and , without any prior knowledge on their smoothness. We prove that its -risk on a compact set is bounded by the sum of the two -risks of the estimators of and , and give the rate of convergence of such estimators for various smoothness classes for and , when the errors are either ordinary smooth or super smooth. The resulting rate is optimal in a minimax sense in all cases where lower bounds are available.
Cite
@article{arxiv.math/0511111,
title = {Nonparametric Estimation of the Regression Function in an Errors-in-Variables Model},
author = {Fabienne Comte and Marie-Luce Taupin},
journal= {arXiv preprint arXiv:math/0511111},
year = {2008}
}