Gaussian Approximation for High Dimensional Time Series
Abstract
We consider the problem of approximating sums of high-dimensional stationary time series by Gaussian vectors, using the framework of functional dependence measure. The validity of the Gaussian approximation depends on the sample size , the dimension , the moment condition and the dependence of the underlying processes. We also consider an estimator for long-run covariance matrices and study its convergence properties. Our results allow constructing simultaneous confidence intervals for mean vectors of high-dimensional time series with asymptotically correct coverage probabilities. A Gaussian multiplier bootstrap method is proposed. A simulation study indicates the quality of Gaussian approximation with different , under different moment and dependence conditions.
Cite
@article{arxiv.1508.07036,
title = {Gaussian Approximation for High Dimensional Time Series},
author = {Danna Zhang and Wei Biao Wu},
journal= {arXiv preprint arXiv:1508.07036},
year = {2015}
}