Least squares estimation for non-ergodic weighted fractional Ornstein-Uhlenbeck process of general parameters

Abstract

Let Ba,b:=\Bta,b,t≥0\ be a weighted fractional Brownian motion of parameters a>-1, |b|<1, |b|<a+1. We consider a least square-type method to estimate the drift parameter θ>0 of the weighted fractional Ornstein-Uhlenbeck process X:=\Xt,t≥0\ defined by X0=0; \ dXt=θ Xtdt+dBta,b. In this work, we provide least squares-type estimators for θ based continuous-time and discrete-time observations of X. The strong consistency and the asymptotic behavior in distribution of the estimators are studied for all (a,b) such that a>-1, |b|<1, |b|<a+1. Here we extend the results of SYY2,SYY (resp. CSC), where the strong consistency and the asymptotic distribution of the estimators are proved for -12<a<0, -a<b<a+1 (resp. -1<a<0, -a<b<a+1).