LAN property for some fractional type Brownian motion

Abstract

We study asymptotic expansion of the likelihood of a certain class of Gaussian processes characterized by their spectral density fθ. We consider the case where fθx x 0 x-(θ)Lθ(x) with Lθ a slowly varying function and θ∈ (-∞,1). We prove LAN property for these models which include in particular fractional Brownian motion %Bαt,\: α ≥ 1/2 or ARFIMA processes.