Angular momentum projected analysis of Quadrupole Collectivity in (30,32,34Mg) and (32,34,36,38Si) with the Gogny interaction
Abstract
A microscopic angular momentum projection after variation is used to describe quadrupole collectivity in (30,32,34Mg) and (32,34,36,38Si). The Hartree-Fock-Bogoliubov states obtained in the quadrupole constrained mean field approach are taken as intrinsic states for the projection. Excitation energies of the first (2+) states and the (B(E2,0+ 2+)) transition probabilities are given. A reasonable agreement with available experimental data is obtained. It is also shown that the mean field picture of those nuclei is strongly modified by the projection.
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