Transition strengths and quantum chaos in large shell-model spaces

Abstract

Shell-model results for the electric quadrupole $(E2),$ magnetic dipole $(M1),$ and Gamow-Teller transition strength sums and occupation numbers are calculated using different valence spaces and compared to the embedded Gaussian orthogonal ensemble (EGOE) predictions. It is shown that transition strength sums can be considered as a new statistic able to distinguish between regular and chaotic motion. Moreover it is established that the EGOE (but not the GOE) provides the good description of the shell-model strength sums in the chaotic domain. To get this result we have studied the behavior of strength sums in order to chaos transitions generated by means of a family of Hamiltonians $H(\ensuremath{\lambda})=h(1)+\ensuremath{\lambda}V(2),$ built from realistic one- and two-body interactions.