Lp uniform random walk-type approximation for fractional Brownian motion with Hurst exponent 0 < H < 12

Abstract

In this note, we prove an Lp uniform approximation of the fractional Brownian motion with Hurst exponent 0 < H < 12 by means of a family of continuous-time random walks imbedded on a given Brownian motion. The approximation is constructed via a pathwise representation of the fractional Brownian motion in terms of a standard Brownian motion. For an arbitrary choice εk for the size of the jumps of the family of random walks, the rate of convergence of the approximation scheme is O(εkp(1-2λ)+ 2(δ-1)) whenever \0,1-pH2\< δ < 1, λ ∈ (1-H2, 12 + δ-1p).