Quantitative estimates of the singular values of random i.i.d. matrices
Abstract
Let M be an n× n random i.i.d. matrix. This paper studies the deviation inequality of sn-k+1(M), the k-th smallest singular value of M. In particular, when the entries of M are subgaussian, we show that for any γ∈ (0, 1/2), >0 and n k cn align P\sn-k+1(M) n \ ( Ck)γ k2+e-c1kn. align This result improves an existing result of Nguyen, which obtained a deviation inequality of sn-k+1(M) with (C/k)γ k2+e-cn decay.
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