Berry-Ess\'een bounds for the least squares estimator for discretely observed fractional Ornstein-Uhlenbeck processes

Abstract

Let θ>0. We consider a one-dimensional fractional Ornstein-Uhlenbeck process defined as dXt= -θ\ Xt dt+dBt, t≥0, where B is a fractional Brownian motion of Hurst parameter H∈(1/2,1). We are interested in the problem of estimating the unknown parameter θ. For that purpose, we dispose of a discretized trajectory, observed at n equidistant times ti=in, i=0,...,n, and Tn=nn denotes the length of the `observation window'. We assume that n → 0 and Tn→ ∞ as n→ ∞. As an estimator of θ we choose the least squares estimator (LSE) θn. The consistency of this estimator is established. Explicit bounds for the Kolmogorov distance, in the case when H∈(1/2,3/4), in the central limit theorem for the LSE θn are obtained. These results hold without any kind of ergodicity on the process X.