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On singular values distribution of a large auto-covariance matrix in the ultra-dimensional regime

Abstract

Let (εt)t>0(\varepsilon_{t})_{t>0} be a sequence of independent real random vectors of pp-dimension and let XT=t=s+1s+TεtεtsT/TX_T=\sum_{t=s+1}^{s+T}\varepsilon_t\varepsilon^T_{t-s}/T be the lag-ss (ss is a fixed positive integer) auto-covariance matrix of εt\varepsilon_t. This paper investigates the limiting behavior of the singular values of XTX_T under the so-called {\em ultra-dimensional regime} where pp\to\infty and TT\to\infty in a related way such that p/T0p/T\to 0. First, we show that the singular value distribution of XTX_T after a suitable normalization converges to a nonrandom limit GG (quarter law) under the forth-moment condition. Second, we establish the convergence of its largest singular value to the right edge of GG. Both results are derived using the moment method.Comment: 32 pages, 2 figure

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