Phase transition for the smallest eigenvalue of covariance matrices

Abstract

In this paper, we study the smallest non-zero eigenvalue of the sample covariance matrices S(Y)=YY*, where Y=(yij) is an M× N matrix with iid mean 0 variance N-1 entries. We prove a phase transition for its distribution, induced by the fatness of the tail of yij's. More specifically, we assume that yij is symmetrically distributed with tail probability P(|Nyij|≥ x) x-α when x ∞, for some α∈ (2,4). We show the following conclusions: (i). When α>83, the smallest eigenvalue follows the Tracy-Widom law on scale N-23; (ii). When 2<α<83, the smallest eigenvalue follows the Gaussian law on scale N-α4; (iii). When α=83, the distribution is given by an interpolation between Tracy-Widom and Gaussian; (iv). In case α≤ 103, in addition to the left edge of the MP law, a deterministic shift of order N1-α2 shall be subtracted from the smallest eigenvalue, in both the Tracy-Widom law and the Gaussian law. Overall speaking, our proof strategy is inspired by ALY which is originally done for the bulk regime of the L\'evy Wigner matrices. In addition to various technical complications arising from the bulk-to-edge extension, two ingredients are needed for our derivation: an intermediate left edge local law based on a simple but effective matrix minor argument, and a mesoscopic CLT for the linear spectral statistic with asymptotic expansion for its expectation.