Spectral Properties of the Overlap Dirac Operator in QCD

Abstract

We discuss the eigenvalue distribution of the overlap Dirac operator in quenched QCD on lattices of size 84, 104 and 124 at β = 5.85 and β = 6. We distinguish the topological sectors and study the distributions of the leading non-zero eigenvalues, which are stereographically mapped onto the imaginary axis. Thus they can be compared to the predictions of random matrix theory applied to the ε-expansion of chiral perturbation theory. We find a satisfactory agreement, if the physical volume exceeds about (1.2 fm)4. For the unfolded level spacing distribution we find an accurate agreement with the random matrix conjecture on all volumes that we considered.