Universal Spectral Correlations at the Mobility Edge
arXiv:cond-mat/9402026 · doi:10.1103/PhysRevLett.72.888
Abstract
We demonstrate the level statistics in the vicinity of the Anderson transition in $d>2$ dimensions to be universal and drastically different from both Wigner-Dyson in the metallic regime and Poisson in the insulator regime. The variance of the number of levels $N$ in a given energy interval with $\langle N\rangle\gg1$ is proved to behave as $\langle N\rangle^γ$ where $γ=1-(νd)^{-1}$ and $ν$ is the correlation length exponent. The inequality $γ<1$, shown to be required by an exact sum rule, results from nontrivial cancellations (due to the causality and scaling requirements) in calculating the two-level correlation function.
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