Empirical process sampled along a stationary process

Abstract

Let (X) ∈ Zd be a real random field (r.f.) indexed by Zd with common probability distribution function F. Let (zk)k=0∞ be a sequence in Zd. The empirical process obtained by sampling the random field along (zk) is Σk=0n-1 [ 1Xzk ≤ s- F(s)]. We give conditions on (zk) implying the Glivenko-Cantelli theorem for the empirical process sampled along (zk) in different cases (independent, associated or weakly correlated random variables). We consider also the functional central limit theorem when the X's are i.i.d. These conditions are examined when (zk) is provided by an auxiliary stationary process in the framework of ``random ergodic theorems''.