Toeplitz band matrices with small random perturbations
Abstract
We study the spectra of N× N Toeplitz band matrices perturbed by small complex Gaussian random matrices, in the regime N 1. We prove a probabilistic Weyl law, which provides an precise asymptotic formula for the number of eigenvalues in certain domains, which may depend on N, with probability sub-exponentially (in N) close to 1. We show that most eigenvalues of the perturbed Toeplitz matrix are at a distance of at most O(N-1+), for all >0, to the curve in the complex plane given by the symbol of the unperturbed Toeplitz matrix.
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