Level statistics of one-dimensional Schr\"odinger operators with random decaying potential
Abstract
We study the level statistics of one-dimensional Schr\"odinger operator with random potential decaying like x-α at infinity. We consider the point process L consisting of the rescaled eigenvalues and show that : (i)(ac spectrum case) for α > 12, L converges to a clock process, and the fluctuation of the eigenvalue spacing converges to Gaussian. (ii)(critical case) for α = 12, L converges to the limit of the circular β-ensemble.
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