Estimation and Testing for High-dimensional Near Unit Root Time Series
40 Pages Posted: 13 May 2020
Date Written: April 18, 2020
Abstract
We investigate some estimation and testing issues for a class of high-dimensional near unit root time series models. We first study the asymptotic behavior of the first k largest eigenvalues of the sample covariance matrices of the time series model. Then we propose a new estimator for the high–dimensional near unit root setting through using the largest eigenvalues of the sample covariance matrices and use it to test for near unit roots. Such an approach is theoretically novel and addresses some important estimation and testing issues in the high–dimensional near unit root setting. Simulations are also conducted to demonstrate the finite–sample performance of the proposed test statistic.
Keywords: Asymptotic normality, largest eigenvalue, linear process, near unit root test.
JEL Classification: C21, C32
Suggested Citation: Suggested Citation
