Drift estimation for rough processes under small noise asymptotic : trajectory fitting method

Abstract

We consider a process X that solves a stochastic Volterra equation with an unknown parameter θ in the drift function. The Volterra kernel is singular, and includes as an example, K\0(u)=c uα-1/2 u>0 with α∈ (0,1/2). It is assumed that the diffusion coefficient is proportional to 0. From an observation of the path (X\s)\s∈[0,T], we construct a Trajectory Fitting Estimator, which is shown to be consistent and asymptotically normal. We also specify identifiability conditions insuring the Lp convergence of the estimator.