The space of Dunkl monogenics associated with Z23 and the universal Bannai--Ito algebra

Abstract

Let n≥ 0 denote an integer. Let Mn denote the space of Dunkl monogenics of degree n associated with the reflection group Z23. The universal Bannai--Ito algebra BI is a unital associative algebra over C generated by X,Y,Z and the relations assert that each of gather* \X,Y\-Z, \Y,Z\-X, \Z,X\-Y gather* commutes with X,Y,Z. When the multiplicity function k is real-valued the space Mn supports a BI-module in terms of the symmetries of the spherical Dirac--Dunkl operator. Under the assumption that k is nonnegative, it was shown that Mn=2(n+1) and Mn is isomorphic to a direct sum of two copies of an (n+1)-dimensional irreducible BI-module. In this paper, we improve the aforementioned result.