Thouless Energy and Correlations of QCD Dirac Eigenvalues
arXiv:hep-ph/9807490 · doi:10.1103/PhysRevLett.81.268
Abstract
Eigenvalues and eigenfunctions of the QCD Dirac operator are studied for an instanton liquid partition function. We find that for energy differences $δE$ below an energy scale $E_c$, identified as the Thouless energy, the eigenvalue correlations are given by Random Matrix Theory. The value of $E_c$ shows a weak volume dependence for eigenvalues near zero and is consistent with a scaling of $E_c \sim 1/L^2$ in the bulk of the spectrum in agreement with estimates from chiral perturbation theory, that $E_c/Î\approx F_Ï^2 L^2/Ï$ (with average level spacing $Î$). For $δE> E_c$ the number variance shows a linear dependence. For the wave functions we find a small nonzero multifractality index.
4 pages, Latex and 3 postscript figures