Least Non-Zero Singular Value and the Distribution of Eigenvectors of non-Hermitian Random Matrices
Abstract
We obtain a tail bound for the least non-zero singular value of A-z when A is a random matrix and z is an eigenvalue of A in a neighbourhood of a given point z0 in the bulk of the spectrum. The argument relies on a resolvent comparison and a tail bound for Gauss-divisible matrices. The latter can be obtained by the method of partial Schur decomposition. Using this bound we prove that any finite collection of components of a right eigenvector corresponding to an eigenvalue uniformly sampled from a neighbourhood of a point in the bulk is Gaussian. A byproduct of the calculation is an asymptotic formula for the odd moments of the absolute value of the characteristic polynomial of real Gauss-divisible matrices.
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