On a Computable Skorokhod's Integral Based Estimator of the Drift Parameter in Fractional SDE

Abstract

This paper deals with a Skorokhod's integral based least squares type estimator θN of the drift parameter θ0 computed from N∈ N* (possibly dependent) copies X1,…,XN of the solution X of dXt =θ0b(Xt)dt +σ dBt, where B is a fractional Brownian motion of Hurst index H∈ (1/3,1). On the one hand, some convergence results are established on θN when H = 1/2. On the other hand, when H≠ 1/2, Skorokhod's integral based estimators as θN cannot be computed from data, but in this paper some convergence results are established on a computable approximation of θN.