Asymptotic dimensionality for identical-index GE-PI spaces
Prove the conjectured asymptotic formula for the dimension of the group-equivariant and permutation-invariant space of functions with respect to the irreducible representation D^L of SU(2) or SO(3) when all one-particle indices are identical. Specifically, let l > 0 and N ≥ 1, and set the index tuple to (l, …, l) of length N. Let L be an allowed equivariance order (integer for SO(3) or half-integer/integer for SU(2) as appropriate) and define Var = N l (N + 2l + 1) / 6. Show that, for L much smaller than sqrt(Var), the dimension of the GE-PI space satisfies dim = C(N+2l, 2l) * (2L+1) / (2 sqrt(2π) Var^{3/2}) + O(1/N^{5/2}).
References
For identical $$'s, numerical results clearly indicate the asymptotic behavior of the dimensionality, but we were not able to prove the following estimation, which however seems stronger than the results presented in a paper, which implies in particular that l and N go to infinity. Let $ = (l,\ldots,l)\inLN$ containing identical nonzero values $l$, $L\inL_G$ such that $L+\sum\inZ$. Define \textup{Var}_ = \frac{Nl(N+2l+1)}{6}. Then for $L\ll\sqrt{\textup{Var}}$, \begin{equation} \label{eq:dimpi_asymp} #1,#2{}{L} = \binom{N+2l }{ 2l }\left(\frac{2L+1}{2\sqrt{2\pi} (\textup{Var}){3/2}+O\left(\frac{1}{N{5/2}\right)\right). \end{equation}