Finite-Dimensional Irreducible Modules of the Racah Algebra at Characteristic Zero

TL;DR

This paper classifies all finite-dimensional irreducible modules of the Racah algebra over an algebraically closed field of characteristic zero, providing conditions for diagonalizability of key generators.

Contribution

It offers a complete classification of finite-dimensional irreducible modules of the Racah algebra and characterizes when generators are diagonalizable.

Findings

Classification of finite-dimensional irreducible modules

Conditions for diagonalizability of generators

Use of an infinite-dimensional module and its universal property

Abstract

Assume that ${\mathbb F}$ is an algebraically closed field with characteristic zero. The Racah algebra $\Re$ is the unital associative ${\mathbb F}$-algebra defined by generators and relations in the following way. The generators are $A$, $B$, $C$, $D$ and the relations assert that $[A,B]=[B,C]=[C,A]=2D$ and that each of $[A,D]+AC-BA$, $[B,D]+BA-CB$, $[C,D]+CB-AC$ is central in $\Re$. In this paper we discuss the finite-dimensional irreducible $\Re$-modules in detail and classify them up to isomorphism. To do this, we apply an infinite-dimensional $\Re$-module and its universal property. We additionally give the necessary and sufficient conditions for $A$, $B$, $C$ to be diagonalizable on finite-dimensional irreducible $\Re$-modules.