Asymptotic theory for fractional regression models via Malliavin calculus

Abstract

We study the asymptotic behavior as n ∞ of the sequence Sn=Σi=0n-1 K(nα BH1i) (BH2i+1-BH2i) where BH1 and BH2 are two independent fractional Brownian motions, K is a kernel function and the bandwidth parameter α satisfies certain hypotheses in terms of H1 and H2. Its limiting distribution is a mixed normal law involving the local time of the fractional Brownian motion BH1. We use the techniques of the Malliavin calculus with respect to the fractional Brownian motion.