Orthogonal polynomial duality and unitary symmetries of multi--species ASEP(q,θ) and higher--spin vertex models via *--bialgebra structure of higher rank quantum groups

Abstract

We propose a novel, general method to produce orthogonal polynomial dualities from the *--bialgebra structure of Drinfeld--Jimbo quantum groups. The *--structure allows for the construction of certain unitary symmetries, which imply the orthogonality of the duality functions. In the case of the quantum group Uq(gln+1), the result is a nested multivariate q--Krawtchouk duality for the n--species ASEP(q,θ). The method also applies to other quantized simple Lie algebras and to stochastic vertex models. As a probabilistic application of the duality relation found, we provide the explicit formula of the q-shifted factorial moments (namely the q-analogue of the Pochhammer symbol) for the two--species q--TAZRP (totally asymmetric zero range process).