The dual pair (Uq(su(1,1)),oq1/2(2n)), q-oscillators and Askey-Wilson algebras

Abstract

The universal Askey-Wilson algebra AW(3) can be obtained as the commutant of Uq(su(1,1)) in Uq(su(1,1))3. We analyze the commutant of oq1/2(2)oq1/2(2)oq1/2(2) in q-oscillator representations of oq1/2(6) and show that it also realizes AW(3). These two pictures of AW(3) are shown to be dual in the sense of Howe; this is made clear by highlighting the role of the intermediate Casimir elements of each members of the dual pair (Uq(su(1,1)),oq1/2(6)). We also generalize these results. A higher rank extension of the Askey-Wilson algebra denoted AW(n) can be defined as the commutant of Uq(su(1,1)) in Uq(su(1,1)) n and a dual description of AW(n) as the commutant of oq1/2(2) n in q-oscillator representations of oq1/2(2n) is offered by calling upon the dual pair (Uq(su(1,1)),oq1/2(2n)).