Quadrupole properties of the eight SU(3) algebras in (sdgi) space

Abstract

With nucleons occupying an oscillator shell η, there are 2η/2 number of SU(3) algebras; η/2 is the integer part of η/2. Analyzing the first non trivial situation with four SU(3) algebras in (sdg) space, demonstrated recently is that they generate quite different quadrupole properties though they all generate the same spectrum. More complex situation is with eight SU(3) algebras in (sdgi) space. In the present work, quadrupole properties generated by these eight algebras are analyzed first using the more analytically tractable interacting boson model. In addition, shell model and the closely related deformed shell model are used with three examples of nucleons in sdgi space. It is found that in general six of the SU(3) algebras generate prolate shape and two oblate shape. Out of all these, one of the SU(3) algebra generates quite small quadrupole moments for the low-lying states.