On singular value distribution of large dimensional auto-covariance matrices

Abstract

Let (j)j≥ 0 be a sequence of independent p-dimensional random vectors and τ≥1 a given integer. From a sample 1,·s,T+τ-1,T+τ of the sequence, the so-called lag -τ auto-covariance matrix is Cτ=T-1Σj=1Tτ+jjt. When the dimension p is large compared to the sample size T, this paper establishes the limit of the singular value distribution of Cτ assuming that p and T grow to infinity proportionally and the sequence satisfies a Lindeberg condition on fourth order moments. Compared to existing asymptotic results on sample covariance matrices developed in random matrix theory, the case of an auto-covariance matrix is much more involved due to the fact that the summands are dependent and the matrix Cτ is not symmetric. Several new techniques are introduced for the derivation of the main theorem.