Testing for multi-dimensional white noise is an important subject in
statistical inference. Such test in the high-dimensional case becomes an open
problem waiting to be solved, especially when the dimension of a time series is
comparable to or even greater than the sample size. To detect an arbitrary form
of departure from high-dimensional white noise, a few tests have been
developed. Some of these tests are based on max-type statistics, while others
are based on sum-type ones. Despite the progress, an urgent issue awaits to be
resolved: none of these tests is robust to the sparsity of the serial
correlation structure. Motivated by this, we propose a Fisher's combination
test by combining the max-type and the sum-type statistics, based on the
established asymptotically independence between them. This combination test can
achieve robustness to the sparsity of the serial correlation structure,and
combine the advantages of the two types of tests. We demonstrate the advantages
of the proposed test over some existing tests through extensive numerical
results and an empirical analysis.Comment: 84 page