English

Essential Semigroups and Branching Rules

Representation Theory 2024-07-11 v1

Abstract

Let g\mathfrak{g} be a semisimple complex Lie algebra of finite dimension and h\mathfrak{h} be a semisimple subalgebra. We present an approach to find the branching rules for the pair gh\mathfrak{g}\supset\mathfrak{h}. According to an idea of Zhelobenko the information on restriction to h\mathfrak{h} of all irreducible representations of g\mathfrak{g} is contained in one associative algebra, which we call the \emph{branching algebra}. We use an \emph{essential semigroup} Σ\Sigma, which parametrizes some bases in every finite-dimensional irreducible representations of g\mathfrak{g}, and describe the branching rules for gh\mathfrak{g}\supset\mathfrak{h} in terms of a certain subsemigroup Σ\Sigma' of Σ\Sigma. If Σ\Sigma' is finitely generated, then the semigroup algebra corresponding to Σ\Sigma' is a toric degeneration of the branching algebra. We propose the algorithm to find a description of Σ\Sigma' in this case. We give examples by deriving the branching rules for AnAn1A_n\supset A_{n-1}, BnDnB_n\supset D_n, G2A2G_2\supset A_2, B3G2B_3\supset G_2, and F4B4F_4\supset B_4.

Keywords

Cite

@article{arxiv.2407.07756,
  title  = {Essential Semigroups and Branching Rules},
  author = {Andrei Gornitskii},
  journal= {arXiv preprint arXiv:2407.07756},
  year   = {2024}
}
R2 v1 2026-06-28T17:35:53.739Z