Estimation for L\'evy processes from high frequency data within a long time interval

Abstract

In this paper, we study nonparametric estimation of the L\'evy density for L\'evy processes, with and without Brownian component. For this, we consider n discrete time observations with step . The asymptotic framework is: n tends to infinity, =n tends to zero while nn tends to infinity. We use a Fourier approach to construct an adaptive nonparametric estimator of the L\'evy density and to provide a bound for the global L2-risk. Estimators of the drift and of the variance of the Gaussian component are also studied. We discuss rates of convergence and give examples and simulation results for processes fitting in our framework.