Nonparametric estimation for a stochastic volatility model

Abstract

Consider discrete time observations (Xδ)1≤ ≤ n+1 of the process X satisfying dXt= Vt dBt, with Vt a one-dimensional positive diffusion process independent of the Brownian motion B. For both the drift and the diffusion coefficient of the unobserved diffusion V$, we propose nonparametric least square estimators, and provide bounds for theirrisk. Estimators are chosen among a collection of functions belonging to a finite dimensional space whose dimension is selected by a data driven procedure. Implementation on simulated data illustrates how the method works.