The Universal Askey-Wilson Algebra and DAHA of Type (C1,C1)

Abstract

Let F denote a field, and fix a nonzero q∈ F such that q4=1. The universal Askey-Wilson algebra q is the associative F-algebra defined by generators and relations in the following way. The generators are A, B, C. The relations assert that each of A+qBC-q-1CBq2-q-2, B+qCA-q-1ACq2-q-2, C+qAB-q-1BAq2-q-2 is central in q. The universal DAHA Hq of type (C1,C1) is the associative F-algebra defined by generators t1ii=03 and relations (i) ti t-1i=t-1i ti=1; (ii) ti+t-1i is central; (iii) t0t1t2t3=q-1. We display an injection of F-algebras :q Hq that sends A t1t0+(t1t0)-1, B t3t0+(t3t0)-1, C t2t0+(t2t0)-1. For the map we compute the image of the three central elements mentioned above. The algebra q has another central element of interest, called the Casimir element . We compute the image of under . We describe how the Artin braid group B3 acts on q and Hq as a group of automorphisms. We show that commutes with these B3 actions. Some related results are obtained.