Finite-dimensional irreducible modules of the universal Askey--Wilson algebra at roots of unity

Abstract

Let F denote an algebraically closed field and assume that q∈ F is a primitive d \, th root of unity with d=1,2,4. The universal Askey--Wilson algebra q is a unital associative F-algebra defined by generators and relations. The generators are A,B,C and the relations assert that each of gather* A+qBC-q-1CBq2-q-2, B+qCA-q-1ACq2-q-2, C+qAB-q-1BAq2-q-2 gather* commutes with A,B,C. We show that every finite-dimensional irreducible q-module is of dimension less than or equal to \ arrayll d &if d is odd; d/2 &if d is even. array . Moreover we provide an example to show that the bound is tight.