Modified Euler approximation scheme for stochastic differential equations driven by fractional Brownian motions

Abstract

For a stochastic differential equation driven by a fractional Brownian motion with Hurst parameter H> 12 it is known that the classical Euler scheme has the rate of convergence 2H-1. In this paper we introduce a new numerical scheme which is closer to the classical Euler scheme for diffusion processes, in the sense that it has the rate of convergence 2H-12. In particular, the rate of convergence becomes 12 when H is formally set to 12 (the rate of Euler scheme for classical Brownian motion). The rate of weak convergence is also deduced for this scheme. The main tools are fractional calculus and Malliavin calculus. We also apply our approach to the classical Euler scheme.