Discretizing the fractional Levy area

Abstract

In this article, we give sharp bounds for the Euler- and trapezoidal discretization of the Levy area associated to a d-dimensional fractional Brownian motion. We show that there are three different regimes for the exact root mean-square convergence rate of the Euler scheme. For H<3/4 the exact convergence rate is n-2H+1/2, where n denotes the number of the discretization subintervals, while for H=3/4 it is n-1 (log(n))1/2 and for H>3/4 the exact rate is n-1. Moreover, the trapezoidal scheme has exact convergence rate n-2H+1/2 for H>1/2. Finally, we also derive the asymptotic error distribution of the Euler scheme. For H lesser than 3/4 one obtains a Gaussian limit, while for H>3/4 the limit distribution is of Rosenblatt type.