Necessary and sufficient conditions for the asymptotic distributions of coherence of ultra-high dimensional random matrices

Abstract

Let x1,…, xn be a random sample from a p-dimensional population distribution, where p=pn∞ and p=o(nβ) for some 0<β≤1, and let Ln be the coherence of the sample correlation matrix. In this paper it is proved that n/ pLn2 in probability if and only if Eet0|x11|α<∞ for some t0>0, where α satisfies β=α/(4-α). Asymptotic distributions of Ln are also proved under the same sufficient condition. Similar results remain valid for m-coherence when the variables of the population are m dependent. The proofs are based on self-normalized moderate deviations, the Stein-Chen method and a newly developed randomized concentration inequality.