The universal DAHA of type (C1,C1) and Leonard triples

Abstract

Assume that F is an algebraically closed field and q is a nonzero scalar in F that is not a root of unity. The universal Askey--Wilson algebra q is a unital associative F-algebra generated by A,B, C and the relations state that each of A+q BC-q-1 CBq2-q-2, B+q CA-q-1 ACq2-q-2, C+q AB-q-1 BAq2-q-2 is central in q. The universal DAHA Hq of type (C1,C1) is a unital associative F-algebra generated by \ti 1\i=03 and the relations state that gather* titi-1=ti-1 ti=1 for all i=0,1,2,3; \\ ti+ti-1 is central for all i=0,1,2,3; \\ t0t1t2t3=q-1. gather* It was given an F-algebra homomorphism q Hq that sends eqnarray* A & & t1 t0+(t1 t0)-1, \\ B & & t3 t0+(t3 t0)-1, \\ C & & t2 t0+(t2 t0)-1. eqnarray* Therefore any Hq-module can be considered as a q-module. Let V denote a finite-dimensional irreducible Hq-module. In this paper we show that A,B,C are diagonalizable on V if and only if A,B,C act as Leonard triples on all composition factors of the q-module V.