Berry-Esseen bounds of second moment estimators for Gaussian processes observed at high frequency

Abstract

Let Z:=\Zt,t≥0\ be a stationary Gaussian process. We study two estimators of E[Z02], namely fT(Z):= 1T ∫0T Zt2dt, and fn(Z) :=1n Σi =1n Zti2, where ti = i n, i=0,1,…, n , n→ 0 and Tn := n n→ ∞. We prove that the two estimators are strongly consistent and establish Berry-Esseen bounds for a central limit theorem involving fT(Z) and fn(Z). We apply these results to asymptotically stationary Gaussian processes and estimate the drift parameter for Gaussian Ornstein-Uhlenbeck processes.