Non standard functional limit laws for the increments of the compound empirical distribution function

Abstract

Let (Yi,Zi)i≥ 1 be a sequence of independent, identically distributed (i.i.d.) random vectors taking values in k×d, for some integers k and d. Given z∈ d, we provide a nonstandard functional limit law for the sequence of functional increments of the compound empirical process, namely n,(hn,z,·):= 1nhn 1[0,·) Zi-zhn1/d Yi. Provided that nhn c n as , we obtain, under some natural conditions on the conditional exponential moments of Y Z=z, that n,(hn,z,·) surely, where denotes the clustering process under the sup norm on . Here, is a compact set that is related to the large deviations of certain compound Poisson processes.