Critical regime of two dimensional Ando model: relation between critical conductance and fractal dimension of electronic eigenstates
arXiv:cond-mat/0511434 · doi:10.1088/0305-4470/39/13/003
Abstract
The critical two-terminal conductance $g_c$ and the spatial fluctuations of critical eigenstates are investigated for a disordered two dimensional model of non-interacting electrons subject to spin-orbit scattering (Ando model). For square samples, we verify numerically the relation $Ï_c=1/[2Ï(2-D(1))] e^2/h$ between critical conductivity $Ï_c=g_c=(1.42\pm 0.005) e^2/h$ and the fractal information dimension of the electron wave function, $D(1)=1.889\pm 0.001$. Through a detailed numerical scaling analysis of the two-terminal conductance we also estimate the critical exponent $ν=2.80\pm 0.04$ that governs the quantum phase transition.
IOP Latex, 7 figures