A simple adaptive estimator of the integrated square of a density

Abstract

Given an i.i.d. sample X1,...,Xn with common bounded density f0 belonging to a Sobolev space of order α over the real line, estimation of the quadratic functional ∫Rf02(x) dx is considered. It is shown that the simplest kernel-based plug-in estimator \[2n(n-1)hnΣ1≤ i<j≤ nK(Xi-Xjhn)\] is asymptotically efficient if α>1/4 and rate-optimal if α1/4. A data-driven rule to choose the bandwidth hn is then proposed, which does not depend on prior knowledge of α, so that the corresponding estimator is rate-adaptive for α ≤1/4 and asymptotically efficient if α>1/4.