Proxy-SU(3) symmetry in the shell model basis
Abstract
The proxy-SU(3) symmetry has been proposed for spin-orbit like nuclear shells using the asymptotic deformed oscillator basis for the single particle orbitals, in which the restoration of the symmetry of the harmonic oscillator shells is achieved by a change of the number of quanta in the z-direction by one unit for the intruder parity orbitals. The same definition suffices within the cartesian basis of the Elliott SU(3) model. Through a mapping of the cartesian Elliott basis onto the spherical shell model basis, we translate the proxy-SU(3) approximation into spherical coordinates, proving, that in the spherical shell model basis the proxy-SU(3) approximation corresponds to the replacement of the intruder parity orbitals by their de Shalit--Goldhaber partners. Furthermore it is shown, that the proxy-SU(3) approximation in the cartesian Elliott basis is equivalent to a unitary transformation in the z-coordinate, leaving the x-y plane intact, a result which in the asymptotic deformed oscillator coordinates implies, that the z-projections of angular momenta and spin remain unchanged. The present work offers a microscopic justification of the proxy-SU(3) approximation and in addition paves the way, for taking advantage of the proxy-SU(3) symmetry in shell model calculations.
Keywords
Cite
@article{arxiv.2009.00307,
title = {Proxy-SU(3) symmetry in the shell model basis},
author = {Andriana Martinou and Dennis Bonatsos and N. Minkov and I. E. Assimakis and S. K. Peroulis and S. Sarantopoulou and J. Cseh},
journal= {arXiv preprint arXiv:2009.00307},
year = {2020}
}
Comments
15 pages, 7 tables, 1 figure