Moment approach for singular values distribution of a large auto-covariance matrix

Abstract

Let (t)t>0 be a sequence of independent real random vectors of p-dimension and let XT= Σt=s+1s+TtTt-s/T be the lag-s (s is a fixed positive integer) auto-covariance matrix of t. Since XT is not symmetric, we consider its singular values, which are the square roots of the eigenvalues of XTXTT. Therefore, the purpose of this paper is to investigate the limiting behaviors of the eigenvalues of XTXTT in two aspects. First, we show that the empirical spectral distribution of its eigenvalues converges to a nonrandom limit F. Second, we establish the convergence of its largest eigenvalue to the right edge of F. Both results are derived using moment methods.