Estimating drift parameters in a non-ergodic Gaussian Vasicek-type model

Abstract

We study the problem of parameter estimation for a non-ergodic Gaussian Vasicek-type model defined as dXt=(μ+θ Xt)dt+dGt,\ t≥0 with unknown parameters θ>0 and μ∈R, where G is a Gaussian process. We provide least square-type estimators θT and μT respectively for the drift parameters θ and μ based on continuous-time observations \Xt,\ t∈[0,T]\ as T→∞. Our aim is to derive some sufficient conditions on the driving Gaussian process G in order to ensure that θT and μT are strongly consistent, the limit distribution of θT is a Cauchy-type distribution and μT is asymptotically normal. We apply our result to fractional Vasicek, subfractional Vasicek and bifractional Vasicek processes. In addition, this work extends the result of EEO studied in the case where μ=0.