Number of spin-J states and odd-even staggering for identical particles in a single-j shell

TL;DR

This paper introduces new recursion relations for counting spin-J states of identical particles in a single-j shell, revealing an odd-even staggering effect and providing analytical insights into state distributions.

Contribution

It presents novel recursion relations derived via generating functions that uncover odd-even staggering in spin distributions for fermions in a single-j shell.

Findings

Odd-even staggering in spin state counts

Analytical expression for excess even-J states

Asymptotic behavior for large j

Abstract

In this work, new recursion relations for the number of spin-J states for identical particles in a single-j shell are presented. Such relations are obtained using the generating-function technique, which enables one to exhibit an odd-even staggering in the spin distribution of an even number of fermions in a single-j shell: the number of states with an even value of J is larger than the number of states with an odd value of J. An analytical expression of the excess of states with an even value of J is provided, and its asymptotic behavior for large values of j is discussed.