A Kiefer-Wolfowitz type of result in a general setting, with an application to smooth monotone estimation

Abstract

We consider Grenander type estimators for monotone functions f in a very general setting, which includes estimation of monotone regression curves, monotone densities, and monotone failure rates. These estimators are defined as the left-hand slope of the least concave majorant Fn of a naive estimator Fn of the integrated curve F corresponding to f. We prove that the supremum distance between Fn and Fn is of the order Op(n-1 n)2/(4-τ), for some τ∈[0,4) that characterizes the tail probabilities of an approximating process for Fn. In typical examples, the approximating process is Gaussian and τ=1, in which case the convergence rate is n-2/3( n)2/3 is in the same spirit as the one obtained by Kiefer and Wolfowitz (1976) for the special case of estimating a decreasing density. We also obtain a similar result for the primitive of Fn, in which case τ=2, leading to a faster rate n-1 n, also found by Wang and Woodfroofe (2007). As an application in our general setup, we show that a smoothed Grenander type estimator and its derivative are asymptotically equivalent to the ordinary kernel estimator and its derivative in first order.