A Donsker Theorem for L\'evy Measures

Abstract

Given n equidistant realisations of a L\'evy process (Lt,\,t 0), a natural estimator Nn for the distribution function N of the L\'evy measure is constructed. Under a polynomial decay restriction on the characteristic function φ, a Donsker-type theorem is proved, that is, a functional central limit theorem for the process n ( Nn -N) in the space of bounded functions away from zero. The limit distribution is a generalised Brownian bridge process with bounded and continuous sample paths whose covariance structure depends on the Fourier-integral operator F-1[1/φ(-·)]. The class of L\'evy processes covered includes several relevant examples such as compound Poisson, Gamma and self-decomposable processes. Main ideas in the proof include establishing pseudo-locality of the Fourier-integral operator and recent techniques from smoothed empirical processes.