On spectrum of sample covariance matrices from large tensor vectors

Abstract

In this paper, we investigate the limiting empirical spectral distribution (LSD) of sums of independent rank-one k-fold tensor products of n-dimensional vectors as k,n ∞. Assuming that the base vectors are complex random variables with unit modular, we show that the LSD is the Marcenko-Pastur law. Comparing with the existing results, our limiting setting allows k to grow much faster than n. Consequently, we obtain the necessary and sufficient conditions for Marcenko-Pastur law to serve as the LSD of our matrix model. Our approach is based on the moment method.