Transition from localized to extended eigenstates in the ensemble of power-law random banded matrices

Abstract

We study statistical properties of the ensemble of large N× N random matrices whose entries Hij decrease in a power-law fashion Hij|i-j|-α. Mapping the problem onto a nonlinear σ-model with non-local interaction, we find a transition from localized to extended states at α=1. At this critical value of α the system exhibits multifractality and spectral statistics intermediate between the Wigner-Dyson and Poisson one. These features are reminiscent of those typical for the mobility edge of disordered conductors. We find a continuous set of critical theories at α=1, parametrized by the value of the coupling constant of the σ-model. At α>1 all states are expected to be localized with integrable power-law tails. At the same time, for 1<α<3/2 the wave packet spreading at short time scale is superdiffusive: |r| t12α-1, which leads to a modification of the Altshuler-Shklovskii behavior of the spectral correlation function. At 1/2<α<1 the statistical properties of eigenstates are similar to those in a metallic sample in d=(α-1/2)-1 dimensions. Finally, the region α<1/2 is equivalent to the corresponding Gaussian ensemble of random matrices (α=0). The theoretical predictions are compared with results of numerical simulations.

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