Statistical inference for Vasicek-type model driven by Hermite processes

Abstract

Let Z denote a Hermite process of order q ≥ 1 and self-similarity parameter H ∈ (12, 1). This process is H-self-similar, has stationary increments and exhibits long-range dependence. When q=1, it corresponds to the fractional Brownian motion, whereas it is not Gaussian as soon as q≥ 2. In this paper, we deal with a Vasicek-type model driven by Z, of the form dXt = a(b - Xt)dt +dZt. Here, a > 0 and b ∈ R are considered as unknown drift parameters. We provide estimators for a and b based on continuous-time observations. For all possible values of H and q, we prove strong consistency and we analyze the asymptotic fluctuations.