The rate of convergence for Euler approximations of solutions of stochastic differential equations driven by fractional Brownian motion

The paper focuses on discrete-type approximations of solutions to non-homogeneous stochastic differential equations (SDEs) involving fractional Brownian motion (fBm). We prove that the rate of convergence for Euler approximations of solutions of pathwise SDEs driven by fBm with Hurst index H > 1/2 can be estimated by O(delta(2H-1)), where delta is the diameter of partition used for discretization. For discrete-time approximations of Skorohodtype quasilinear equation driven by fBm we prove that the rate of convergence is O(delta(H)).