Two-level correlation function of critical random-matrix ensembles
Abstract
The two-level correlation function Rd,β(s) of d-dimensional disordered models (d=1, 2, and 3) with long-range random-hopping amplitudes is investigated numerically at criticality. We focus on models with orthogonal (β=1) or unitary (β=2) symmetry in 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 Rd,β(s) is of the form Rd,β(s)=1+δ(s)-Fβ(sβ/bdβ), where F1(x)=erfc(ad,β x) and F2(x)= (-ad,β x2), with ad,β being a numerical coefficient depending on the dimensionality and the universality class. Finally, the level number variance and the spectral compressibility are also considerded.
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