English

Multiple multi-orbit pairing algebras in shell model and interacting boson models

Nuclear Theory 2021-07-15 v1 Mathematical Physics math.MP

Abstract

In nuclei with valence nucleons are say identical nucleons and say these nucleons occupy several-jj orbits, then it is possible to consider pair creation operator S+S_+ to be a sum of the single-jj shell pair creation operators S+(j)S_+(j) with arbitrary phases, S+=jαjS+(j);αj=±1S_+=\sum_j \alpha_j S_+(j); \alpha_j=\pm 1. In this situation, it is possible to define multi-orbit or generalized seniority that corresponds to the quasi-spin SU(2)SU(2) algebra generated by S+S_+, S=(S+)S_-=(S_+)^\dagger and S0=(n^Ω)/2S_0=(\hat{n} -\Omega)/2 operators; n^\hat{n} is number operator and Ω=[j(2j+1)]/2\Omega=[\sum_j (2j+1)]/2. There are now multiple pairing quasi-spin SU(2)SU(2) algebras. Also, the αj\alpha_j's and the generators of the corresponding generalized seniority generating sympletic algebras Sp(2Ω)Sp(2\Omega) in U(2Ω)Sp(2Ω)U(2\Omega) \supset Sp(2\Omega) have one-to-one correspondence. Using these, derived are the special seniority selection rules for electromagnetic transitions. A particular choice for αj\alpha_j's as advocated by Arvieu and Moszkowski (AM) in the past gives pairing Hamiltonians having maximum correlation with well known effective interactions. The various results derived for identical fermion systems are shown to extend to identical boson systems with the bosons occupying several-\ell orbits as for example in sdsd, spsp, sdgsdg and sdpfsdpf IBM's. The quasi-spin algebra here is SU(1,1)SU(1,1) and the generalized seniority quantum number is generated by SO(2Ω)SO(2\Omega) in U(2Ω)SO(2Ω)U(2\Omega) \supset SO(2\Omega). The different SO(2Ω)SO(2\Omega) algebras here will be important in the study of quantum phase transitions and order-chaos transitions in nuclei.

Keywords

Cite

@article{arxiv.1707.03552,
  title  = {Multiple multi-orbit pairing algebras in shell model and interacting boson models},
  author = {V. K. B. Kota},
  journal= {arXiv preprint arXiv:1707.03552},
  year   = {2021}
}

Comments

25 pages, 3 figure

R2 v1 2026-06-22T20:44:19.217Z