Critical level statistics at the Anderson transition in four-dimensional disordered systems

Abstract

The level spacing distribution is numerically calculated at the disorder-induced metal--insulator transition for dimensionality d=4 by applying the Lanczos diagonalisation. The critical level statistics are shown to deviate stronger from the result of the random matrix theory compared to those of d=3 and to become closer to the Poisson limit of uncorrelated spectra. Using the finite size scaling analysis for the probability distribution Qn(E) of having n levels in a given energy interval E we find the critical disorder Wc = 34.5 0.5, the correlation length exponent = 1.1 0.2 and the critical spectral compressibility kc ≈ 0.5.

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