Add to ORKGWe compare the lower edge spectral fluctuations of the staggered lattice Dirac operator for the Schwinger model with the predictions of chiral Random Matrix Theory (chRMT). We verify their range of applicability, checking in particular the role of non-trivial topological sectors and the flavor symmetry of the staggered fermions for finite lattice spacing. Approaching the continuum limit we indeed find clear signals for topological modes in the eigenvalue spectrum. These findings indicate problems in the verification of the chRMT predictions
The microscopic spectral eigenvalue correlations of QCD Dirac operators in the presence of dynamical...
The microscopic spectrum of the QCD Dirac operator is shown to obey random matrix model statistics i...
Abstract: The distribution and the correlations of the small eigenvalues of the Dirac operator are d...
We have computed ensembles of complete spectra of the staggered Dirac operator using four-dimensiona...
We investigate and clarify the role of topology and the issues surrounding the epsilon regime for st...
Measurements of the lowest-lying eigenvalues of the staggered fermion Dirac operator are made on ens...
In this lecture we argue that the fluctuations of Dirac eigenvalues on the finest scale, i.e. on the...
We investigate the eigenvalue spectrum of the staggered Dirac matrix in SU(3) gauge theory and in fu...
We investigate the eigenvalue spectrum of the staggered Dirac matrix in SU(3) gauge theory and in fu...
In non-Hermitian random matrix theory there are three universality classes for local spectral correl...
AbstractWe investigate numerically the spectral flow introduced by Adams for the staggered Dirac ope...
The microscopic spectral eigenvalue correlations of QCD Dirac operators in the presence of dynamical...
We consider the spectrum of the staggered Dirac operator with SU(2) gauge fields. Our study is motiv...
In non-Hermitian random matrix theory there are three universality classes for local spectral correl...
In non-Hermitian random matrix theory there are three universality classes for local spectral correl...
The microscopic spectral eigenvalue correlations of QCD Dirac operators in the presence of dynamical...
The microscopic spectrum of the QCD Dirac operator is shown to obey random matrix model statistics i...
Abstract: The distribution and the correlations of the small eigenvalues of the Dirac operator are d...
We have computed ensembles of complete spectra of the staggered Dirac operator using four-dimensiona...
We investigate and clarify the role of topology and the issues surrounding the epsilon regime for st...
Measurements of the lowest-lying eigenvalues of the staggered fermion Dirac operator are made on ens...
In this lecture we argue that the fluctuations of Dirac eigenvalues on the finest scale, i.e. on the...
We investigate the eigenvalue spectrum of the staggered Dirac matrix in SU(3) gauge theory and in fu...
We investigate the eigenvalue spectrum of the staggered Dirac matrix in SU(3) gauge theory and in fu...
In non-Hermitian random matrix theory there are three universality classes for local spectral correl...
AbstractWe investigate numerically the spectral flow introduced by Adams for the staggered Dirac ope...
The microscopic spectral eigenvalue correlations of QCD Dirac operators in the presence of dynamical...
We consider the spectrum of the staggered Dirac operator with SU(2) gauge fields. Our study is motiv...
In non-Hermitian random matrix theory there are three universality classes for local spectral correl...
In non-Hermitian random matrix theory there are three universality classes for local spectral correl...
The microscopic spectral eigenvalue correlations of QCD Dirac operators in the presence of dynamical...
The microscopic spectrum of the QCD Dirac operator is shown to obey random matrix model statistics i...
Abstract: The distribution and the correlations of the small eigenvalues of the Dirac operator are d...