Estimation in models driven by fractional Brownian motion

Abstract

Let \bH(t),t∈R\ be the fractional Brownian motion with parameter 0<H<1. When 1/2<H, we consider diffusion equations of the type \[X(t)=c+∫0tσ(X(u)) dbH(u)+∫ 0tμ(X(u)) du.\] In different particular models where σ(x)=σ or σ(x)=σ x and μ(x)=μ or μ(x)=μ x, we propose a central limit theorem for estimators of H and of σ based on regression methods. Then we give tests of the hypothesis on σ for these models. We also consider functional estimation on σ(·) in the above more general models based in the asymptotic behavior of functionals of the 2nd-order increments of the fBm.