Asymptotic properties of eigenmatrices of a large sample covariance matrix

Abstract

Let Sn=1nXnXn* where Xn=\Xij\ is a p× n matrix with i.i.d. complex standardized entries having finite fourth moments. Let Yn( t1, t2,σ)=p( xn( t1)*(Sn+σ I)-1 xn( t2)- xn( t1)* xn( t2)mn(σ)) in which σ>0 and mn(σ)=∫dFyn(x)x+σ where Fyn(x) is the Marcenko--Pastur law with parameter yn=p/n; which converges to a positive constant as n∞, and xn( t1) and xn( t2) are unit vectors in Cp, having indices t1 and t2, ranging in a compact subset of a finite-dimensional Euclidean space. In this paper, we prove that the sequence Yn( t1, t2,σ) converges weakly to a (2m+1)-dimensional Gaussian process. This result provides further evidence in support of the conjecture that the distribution of the eigenmatrix of Sn is asymptotically close to that of a Haar-distributed unitary matrix.