Finite-dimensional modules of the universal Racah algebra and the universal additive DAHA of type (C1,C1)

Abstract

Assume that F is an algebraically closed field with characteristic zero. The universal Racah algebra is a unital associative F-algebra defined by generators and relations. The generators are A,B, C, D and the relations state that [A,B]=[B,C]=[C,A]=2D and each of gather* [A,D]+AC-BA, [B,D]+BA-CB, [C,D]+CB-AC gather* is central in . The universal additive DAHA (double affine Hecke algebra) H of type (C1,C1) is a unital associative F-algebra generated by t0,t1,t0,t1 and the relations state that t0+t1+t0+t1=-1 and each of t02, t12, t0 2, t1 2 is central in H. Each H-module is an -module by pulling back via the algebra homomorphism H given by eqnarray* A & & (t1+t0)(t1+t0+2)4, \\ B & & (t1+t1)(t1+t1+2)4, \\ C & & (t0+t1)(t0+t1+2)4. eqnarray* Let V denote any finite-dimensional irreducible H-module. The set of -submodules of V forms a lattice under the inclusion partial order. We classify the lattices that arise by this construction. As a consequence, the -module V is completely reducible if and only if t0 is diagonalizable on V.