Extended commutator algebra for the q-oscillator and a related Askey-Wilson algebra

Abstract

Let q be a nonzero complex number that is not a root of unity. In the q-oscillator with commutation relation a a+-qa+ a =1, it is known that the smallest commutator algebra of operators containing the creation and annihilation operators a+ and a is the linear span of a+ and a , together with all operators of the form a+l[a,a+]k, and [a,a+]k a l, where l is a nonnegative integer and k is a positive integer. That is, linear combinations of operators of the form a h or (a+)h with h≥ 2 or h=0 are outside the commutator algebra generated by a and a+. This is a solution to the Lie polynomial characterization problem for the associative algebra generated by a+ and a . In this work, we extend the Lie polynomial characterization into the associative algebra P=P(q) generated by a , a+, and the operator eω N for some nonzero real parameter ω, where N is the number operator, and we relate this to a q-oscillator representation of the Askey-Wilson algebra AW(3).