On minimal singular values of random matrices with correlated entries

Abstract

Let X be a random matrix whose pairs of entries Xjk and Xkj are correlated and vectors (Xjk,Xkj), for 1 j<k n, are mutually independent. Assume that the diagonal entries are independent from off-diagonal entries as well. We assume that E Xjk=0, E Xjk2=1, for any j,k=1,…,n and E XjkXkj= for 1 j<k n. Let Mn be a non-random n× n matrix with \| Mn\| KnQ, for some positive constants K>0 and Q 0. Let sn( X+ Mn) denote the least singular value of the matrix X+ Mn. It is shown that there exist positive constants A and B depending on K,Q, only such that P(sn( X+ Mn) n-A) n-B. As an application of this result we prove the elliptic law for this class of matrices with non identically distributed correlated entries.