Open Access
November 2013 Uniform convergence of convolution estimators for the response density in nonparametric regression
Anton Schick, Wolfgang Wefelmeyer
Bernoulli 19(5B): 2250-2276 (November 2013). DOI: 10.3150/12-BEJ451

Abstract

We consider a nonparametric regression model $Y=r(X)+\varepsilon$ with a random covariate $X$ that is independent of the error $\varepsilon$. Then the density of the response $Y$ is a convolution of the densities of $\varepsilon$ and $r(X)$. It can therefore be estimated by a convolution of kernel estimators for these two densities, or more generally by a local von Mises statistic. If the regression function has a nowhere vanishing derivative, then the convolution estimator converges at a parametric rate. We show that the convergence holds uniformly, and that the corresponding process obeys a functional central limit theorem in the space $C_{0}(\mathbb{R})$ of continuous functions vanishing at infinity, endowed with the sup-norm. The estimator is not efficient. We construct an additive correction that makes it efficient.

Citation

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Anton Schick. Wolfgang Wefelmeyer. "Uniform convergence of convolution estimators for the response density in nonparametric regression." Bernoulli 19 (5B) 2250 - 2276, November 2013. https://doi.org/10.3150/12-BEJ451

Information

Published: November 2013
First available in Project Euclid: 3 December 2013

zbMATH: 1281.62103
MathSciNet: MR3160553
Digital Object Identifier: 10.3150/12-BEJ451

Keywords: density estimator , Efficient estimator , efficient influence function , functional central limit theorem , local polynomial smoother , local U-statistic , local von Mises statistic , monotone regression function

Rights: Copyright © 2013 Bernoulli Society for Mathematical Statistics and Probability

Vol.19 • No. 5B • November 2013
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