The Casimir elements of the Racah algebra

Abstract

Let F denote a field with char\,F=2. The Racah algebra R is the unital associative F-algebra defined by generators and relations in the following way. The generators are A, B, C, D. The relations assert that [A,B]=[B,C]=[C,A]=2D and each of the elements gather* α=[A,D]+AC-BA, β=[B,D]+BA-CB, γ=[C,D]+CB-AC gather* is central in R. Additionally the element δ=A+B+C is central in R. The algebra R was introduced by Genest-Vinet-Zhedanov. We consider a mild change in their setting to call each element in equation* D2+A2+B2 +(δ+2)\A,B\-\A2,B\-\A,B2\2 +A (β-δ) +B (δ-α)+C equation* a Casimir element of R, where C is the commutative subalgebra of R generated by α, β, γ, δ. The main results of this paper are as follows. Each of the following distinct elements is a Casimir element of R: align* A = D2 + B A C +C A B2 + A2 +B γ -C β -A δ, B = D2 + C B A +A B C2 + B2 +C α -A γ -Bδ, C = D2 + A C B +B C A2 + C2 +A β -Bα -Cδ. align* The set \A,B,C\ is invariant under a faithful D6-action on R. Moreover we show that any Casimir element is algebraically independent over C; if char\,F=0 then the center of R is C[].