Maximum likelihood estimation in the non-ergodic fractional Vasicek model

Abstract

We investigate the fractional Vasicek model described by the stochastic differential equation dXt=(α -β Xt)\,dt+γ \,dBHt, X0=x0, driven by the fractional Brownian motion BH with the known Hurst parameter H∈ (1/2,1). We study the maximum likelihood estimators for unknown parameters α and β in the non-ergodic case (when β <0) for arbitrary x0∈ R, generalizing the result of Tanaka, Xiao and Yu (2019) for particular x0=α /β, derive their asymptotic distributions and prove their asymptotic independence.