Low-rank diffusion matrix estimation for high-dimensional time-changed L\'evy processes
Statistics Theory
2018-11-05 v2 Methodology
Statistics Theory
Abstract
The estimation of the diffusion matrix of a high-dimensional, possibly time-changed L\'evy process is studied, based on discrete observations of the process with a fixed distance. A low-rank condition is imposed on . Applying a spectral approach, we construct a weighted least-squares estimator with nuclear-norm-penalisation. We prove oracle inequalities and derive convergence rates for the diffusion matrix estimator. The convergence rates show a surprising dependency on the rank of and are optimal in the minimax sense for fixed dimensions. Theoretical results are illustrated by a simulation study.
Cite
@article{arxiv.1510.04638,
title = {Low-rank diffusion matrix estimation for high-dimensional time-changed L\'evy processes},
author = {Denis Belomestny and Mathias Trabs},
journal= {arXiv preprint arXiv:1510.04638},
year = {2018}
}
Comments
39 pages, 5 figures