Abstract
This article proposes a new approach to modeling high-dimensional time series by treating a p-dimensional time series as a nonsingular linear transformation of certain common factors and idiosyncratic components. Unlike the approximate factor models, we assume that the factors capture all the nontrivial dynamics of the data, but the cross-sectional dependence may be explained by both the factors and the idiosyncratic components. Under the proposed model, (a) the factor process is dynamically dependent and the idiosyncratic component is a white noise process, and (b) the largest eigenvalues of the covariance matrix of the idiosyncratic components may diverge to infinity as the dimension p increases. We propose a white noise testing procedure for high-dimensional time series to determine the number of white noise components and, hence, the number of common factors, and introduce a projected principal component analysis (PCA) to eliminate the diverging effect of the idiosyncratic noises. Asymptotic properties of the proposed method are established for both fixed p and diverging p as the sample size n increases to infinity. We use both simulated data and real examples to assess the performance of the proposed method. We also compare our method with two commonly used methods in the literature concerning the forecastability of the extracted factors and find that the proposed approach not only provides interpretable results, but also performs well in out-of-sample forecasting. Supplementary materials for this article are available online.
Supplementary Materials
The supplementary materials contain all technical proofs of the theorems in Section 3 and an additional real example consisting of half-hourly temperature data observed at the Adelaide Airport in Australia with p = 508 and n = 336.
Acknowledgments
We are grateful to the editor, associate editor, and the anonymous referees for their insightful comments and suggestions that have substantially improved the presentation and quality of the article.
Funding
This work was completed while Zhaoxing Gao was a Postdoctoral Fellow under the direction of Professor Ruey S. Tsay at Booth School of Business, University of Chicago. This research is supported in part by the Booth School of Business, University of Chicago.