Distribution of level curvatures for the Anderson model at the localization-delocalization transition

Abstract

We compute the distribution function of single-level curvatures, P(k), for a tight binding model with site disorder, on a cubic lattice. In metals P(k) is very close to the predictions of the random-matrix theory (RMT). In insulators P(k) has a logarithmically-normal form. At the Anderson localization-delocalization transition P(k) fits very well the proposed novel distribution P(k) (1+kμ)3/μ with μ ≈ 1.58, which approaches the RMT result for large k and is non-analytical at small k. We ascribe such a non-analiticity to the spatial multifractality of the critical wave functions.

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