On the interval of fluctuation of the singular values of random matrices

Abstract

Let A be a matrix whose columns X1,…, XN are independent random vectors in Rn. Assume that the tails of the 1-dimensional marginals decay as P(| Xi, a|≥ t)≤ t-p uniformly in a∈ Sn-1 and i≤ N. Then for p>4 we prove that with high probability A/n has the Restricted Isometry Property (RIP) provided that Euclidean norms |Xi| are concentrated around n. We also show that the covariance matrix is well approximated by the empirical covariance matrix and establish corresponding quantitative estimates on the rate of convergence in terms of the ratio n/N. Moreover, we obtain sharp bounds for both problems when the decay is of the type (-tα) with α ∈ (0,2], extending the known case α∈[1, 2].