Minimax rates for the covariance estimation of multi-dimensional L\'evy processes with high-frequency data

Abstract

This article studies nonparametric methods to estimate the co-integrated volatility for multi-dimensional L\'evy processes with high frequency data. We construct a spectral estimator for the co-integrated volatility and prove minimax rates for an appropriate bounded nonparametric class of semimartingales. Given n observations of increments over intervals of length 1/n, the rates of convergence are 1 / n if r ≤ 1 and (n n)(r-2)/2 if r>1 , which are optimal in a minimax sense. We bound the co-jump index activity from below with the harmonic mean. Finally, we assess the efficiency of our estimator by comparing it with estimators in the existing literature.