The Racah Algebra as a Subalgebra of the Bannai-Ito Algebra

Abstract

Assume that F is a field with char F=2. The Racah algebra is a unital associative F-algebra defined by generators and relations. The generators are A, B, C, D and the relations assert that [A,B]=[B,C]=[C,A]=2D and each of [A,D]+AC-BA, [B,D]+BA-CB, [C,D]+CB-AC is central in . The Bannai-Ito algebra BI is a unital associative F-algebra generated by X, Y, Z and the relations assert that each of \X,Y\-Z, \Y,Z\-X, \Z,X\-Y is central in BI. It was discovered that there exists an F-algebra homomorphism ζ BI that sends A (2X-3)(2X+1)16, B (2Y-3)(2Y+1)16, C (2Z-3)(2Z+1)16. We show that ζ is injective and therefore can be considered as an F-subalgebra of BI. Moreover we show that any Casimir element of can be uniquely expressed as a polynomial in \X,Y\-Z, \Y,Z\-X, \Z,X\-Y and X+Y+Z with coefficients in F.