A note on the fluctuations of the resolvent traces of a tensor model of sample covariance matrices

Abstract

In this note, we consider a sample covariance matrix of the form Mn=Σα=1m τα yα(1) yα(2)(yα(1) yα(2))T, where (yα(1),\, yα(2))α are independent vectors uniformly distributed on the unit sphere Sn-1 and τα ∈ R+ . We show that as m, n ∞, m/n2 c>0, the centralized traces of the resolvents, Tr(Mn-zIn)-1-ETr(Mn-zIn)-1, z η0>0, converge in distribution to a two-dimensional Gaussian random variable with zero mean and a certain covariance matrix. This work is a continuation of Dembczak-Koodziejczyk and Lytova (2023), and Lytova (2018).