Add to ORKGThe issue of averaging randomness is addressed, mostly in nuclear physics, but shortly also in QCD. The Feshbach approach, so successful in dealing with the continuum spectrum of the atomic nuclei ("optical model"), is extended to encompass bound states as well ("shell model"). Its relationship with the random-matrix theory is discussed and the bearing of the latter on QCD, especially in connection with the spectrum of the Dirac operator, is briefly touched upon. Finally the question of whether Feshbach's theory can cope with the averaging required by QCD is considered
The fluctuation properties of nuclear energy levels are analyzed with new spectrally averaged measur...
The microscopic spectral eigenvalue correlations of QCD Dirac operators in the presence of dynamical...
I shall present a proof of universality of the microscopic spectral correlations in Verbaarschot's r...
The issue of averaging randomness is addressed, mostly in nuclear physics, but shortly also in QCD. ...
We speak of chaos in quantum systems if the statistical properties of the eigenvalue spectrum coinci...
We review recent results obtained in numerical studies of the nuclear shell model and the interactin...
Abstract: Random Matrix Theory (RMT) is a powerful statistical tool to model spectral fluctuations. ...
We investigate the eigenvalue spectrum of the staggered Dirac matrix in SU(3) gauge theory and in fu...
We show and interpret three examples of nontrivial results obtained in numerical simulations of many...
We review the application of random matrix theory (RMT) to chiral symmetry in QCD. Starting from the...
Shell-model calculations with realistic empirical interactions constitute an excellent tool to study...
Although used with increasing frequency in many branches of physics, random matrix ensembles are not...
In this lecture we argue that the fluctuations of Dirac eigenvalues on the finest scale, i.e. on the...
In order to investigate to what extent is the low-lying behavior of even-even nuclei dependent on pa...
In the #epsilon#-regime of QCD the main features of the spectrum of the low-lying eigenvalues of the...
The fluctuation properties of nuclear energy levels are analyzed with new spectrally averaged measur...
The microscopic spectral eigenvalue correlations of QCD Dirac operators in the presence of dynamical...
I shall present a proof of universality of the microscopic spectral correlations in Verbaarschot's r...
The issue of averaging randomness is addressed, mostly in nuclear physics, but shortly also in QCD. ...
We speak of chaos in quantum systems if the statistical properties of the eigenvalue spectrum coinci...
We review recent results obtained in numerical studies of the nuclear shell model and the interactin...
Abstract: Random Matrix Theory (RMT) is a powerful statistical tool to model spectral fluctuations. ...
We investigate the eigenvalue spectrum of the staggered Dirac matrix in SU(3) gauge theory and in fu...
We show and interpret three examples of nontrivial results obtained in numerical simulations of many...
We review the application of random matrix theory (RMT) to chiral symmetry in QCD. Starting from the...
Shell-model calculations with realistic empirical interactions constitute an excellent tool to study...
Although used with increasing frequency in many branches of physics, random matrix ensembles are not...
In this lecture we argue that the fluctuations of Dirac eigenvalues on the finest scale, i.e. on the...
In order to investigate to what extent is the low-lying behavior of even-even nuclei dependent on pa...
In the #epsilon#-regime of QCD the main features of the spectrum of the low-lying eigenvalues of the...
The fluctuation properties of nuclear energy levels are analyzed with new spectrally averaged measur...
The microscopic spectral eigenvalue correlations of QCD Dirac operators in the presence of dynamical...
I shall present a proof of universality of the microscopic spectral correlations in Verbaarschot's r...