The Haar State values of monomials and a method to pick orthonormal bases on O(Uq(3))

Abstract

In this paper, we investigate the evaluation problem of the Haar state on the quantum group O(Uq(n)) (n 3) which is a q-deformation of the Haar measure on the Lie group U(n). The relation between the Haar state values of monomials on O(Uq(n)) is studied. On O(Uq(3)), the Haar state values of monomials are explicitly computed and these values are expressed as a finite summation of rational polynomials in q. As an application, we compute the Gram matrices of the irreducible co-representations of O(Uq(3)) which is essential to the method of constructing orthonormal bases on O(Uq(3)) proposed by Noumi, Yamada, and Mimachi. New connections between the Haar state values of monomials and basic hypergeometric multi-summations are found during our computation.