A limited in bandwidth uniformity for the functional limit law of the increments of the empirical process

Abstract

Consider the following local empirical process indexed by K∈ G, for fixed h>0 and z∈ Rd: Gn(K,h,z):=Σi=1n K (Zi-zh1/d) - (K (Zi-zh1/d)), where the Zi are i.i.d. on Rd. We provide an extension of a result of Mason (2004). Namely, under mild conditions on G and on the law of Z1, we establish a uniform functional limit law for the collections of processes \Gn(·,hn,z), z∈ H, h∈ [hn,hn]\, where H⊂ Rd is a compact set with nonempty interior and where hn and hn satisfy the Cs\"orgo-R\'ev\'esz-Stute conditions.