Mark Rudelson, Roman Vershynin
Published 2007-03-16, updated 2008-01-31Version 2
We prove two basic conjectures on the distribution of the smallest singular value of random n times n matrices with independent entries. Under minimal moment assumptions, we show that the smallest singular value is of order n^{-1/2}, which is optimal for Gaussian matrices. Moreover, we give a optimal estimate on the tail probability. This comes as a consequence of a new and essentially sharp estimate in the Littlewood-Offord problem: for i.i.d. random variables X_k and real numbers a_k, determine the probability P that the sum of a_k X_k lies near some number v. For arbitrary coefficients a_k of the same order of magnitude, we show that they essentially lie in an arithmetic progression of length 1/p.
Comments: Introduction restructured, some typos and minor errors corrected
On the singularity of random matrices with independent entries
Random matrices: Universality of ESDs and the circular law
On the universality of the probability distribution of the product $B^{-1}X$ of random matrices
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