The universal enveloping algebra of sl2 and the Racah algebra

Abstract

Let F denote a field with char\,F=2. The Racah algebra 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 equation* [A,B]=[B,C]=[C,A]=2D equation* 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 . Additionally the element δ=A+B+C is central in . In this paper we explore the relationship between the Racah algebra and the universal enveloping algebra U(sl2). Let a,b,c denote mutually commuting indeterminates. We show that there exists a unique F-algebra homomorphism :[a,b,c]F U(sl2) that sends eqnarray* A && a(a+1) 1+(b-c-a) x+(a+b-c+1) y-1 xy, \\ B && b(b+1) 1+(c-a-b) y+(b+c-a+1) z-1 yz, \\ C && c(c+1) 1+(a-b-c) z+(c+a-b+1) x-1 zx, \\ D && 1 (zyx+zx)+ (c+b(c+a-b)) x +(a+c(a+b-c)) y \\ && +(b+a(b+c-a)) z +\,(b-c) xy+(c-a) yz+(a-b) zx, eqnarray* where x,y,z are the equitable generators for U(sl2). We additionally give the images of α,β,γ,δ, and certain Casimir elements of under . We also show that the map is an injection and thus provides an embedding of into F[a,b,c] U(sl2). We use the injection to show that contains no zero divisors.