Abstract
This study examines a nonparametric inference on a stationary Levy-driven Ornstein-Uhlenbeck (OU) process $X=(X_{t})_{t\geq 0}$ with a compound Poisson subordinator. We propose a new spectral estimator for the Levy measure of the Levy-driven OU process $X$ under macroscopic observations. We also derive, for the estimator, multivariate central limit theorems over a finite number of design points, and high-dimensional central limit theorems in the case wherein the number of design points increases with an increase in the sample size. Built on these asymptotic results, we develop methods to construct confidence bands for the Levy measure and propose a practical method for bandwidth selection.
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