Critical properties in long-range hopping Hamiltonians
Abstract
Some properties of d-dimensional disordered models with long-range random hopping amplitudes are investigated numerically at criticality. We concentrate on the correlation dimension d2 (for d=2) and the nearest level spacing distribution Pc(s) (for d=3) in both the weak (bd 1) and the strong (bd 1) coupling regime, where the parameter b-d plays the role of the coupling constant of the model. It is found that (i) the extrapolated values of d2 are of the form d2=cdbd in the strong coupling limit and d2=d-ad/bd in the case of weak coupling, and (ii) P (s) has the asymptotic form Pc(s) (-Adsα) for s , with the critical exponent α=2-ad/bd for bd 1 and α=1+cd bd for bd 1. In these cases the numerical coefficients Ad, ad and cd depend only on the dimensionality.
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