Unbounded Largest Eigenvalue of Large Sample Covariance Matrices: Asymptotics, Fluctuations and Applications

Abstract

Given a large sample covariance matrix SN= 1nN1/2ZN ZN*N1/2\, , where ZN is a N× n matrix with i.i.d. centered entries, and N is a N× N deterministic Hermitian positive semidefinite matrix, we study the location and fluctuations of λ(SN), the largest eigenvalue of SN as N,n∞ and Nn-1 r∈(0,∞) in the case where the empirical distribution μN of eigenvalues of N is tight (in N) and λ(N) goes to +∞. These conditions are in particular met when μN weakly converges to a probability measure with unbounded support on R+. We prove that asymptotically λ(SN) λ(N). Moreover when the N's are block-diagonal, and the following spectral gap condition is assumed:N∞ λ2(N)λ(N)<1,where λ2(N) is the second largest eigenvalue of N, we prove Gaussian fluctuations for λ(SN)/λ(N) at the scale n.In the particular case where ZN has i.i.d. Gaussian entries and N is the N× N autocovariance matrix of a long memory Gaussian stationary process ( Xt)t∈Z, the columns of N1/2 ZN can be considered as n i.i.d. samples of the random vector ( X1,…, XN)T. We then prove that N is similar to a diagonal matrix which satisfies all the required assumptions of our theorems, hence our results apply to this case.