A Kiefer--Wolfowitz theorem for convex densities
Abstract
Kiefer and Wolfowitz [Z. Wahrsch. Verw. Gebiete 34 (1976) 73--85] showed that if is a strictly curved concave distribution function (corresponding to a strictly monotone density ), then the Maximum Likelihood Estimator , which is, in fact, the least concave majorant of the empirical distribution function , differs from the empirical distribution function in the uniform norm by no more than a constant times almost surely. We review their result and give an updated version of their proof. We prove a comparable theorem for the class of distribution functions with convex decreasing densities , but with the maximum likelihood estimator of replaced by the least squares estimator : if are sampled from a distribution function with strictly convex density , then the least squares estimator of and the empirical distribution function differ in the uniform norm by no more than a constant times almost surely. The proofs rely on bounds on the interpolation error for complete spline interpolation due to Hall [J. Approximation Theory 1 (1968) 209--218], Hall and Meyer [J. Approximation Theory 16 (1976) 105--122], building on earlier work by Birkhoff and de Boor [J. Math. Mech. 13 (1964) 827--835]. These results, which are crucial for the developments here, are all nicely summarized and exposited in de Boor [A Practical Guide to Splines (2001) Springer, New York].
Cite
@article{arxiv.math/0701179,
title = {A Kiefer--Wolfowitz theorem for convex densities},
author = {Fadoua Balabdaoui and Jon A. Wellner},
journal= {arXiv preprint arXiv:math/0701179},
year = {2007}
}
Comments
Published at http://dx.doi.org/10.1214/074921707000000256 in the IMS Lecture Notes Monograph Series (http://www.imstat.org/publications/lecnotes.htm) by the Institute of Mathematical Statistics (http://www.imstat.org)