Quantum algebra approach to univariate and multivariate rational functions of q-Racah type

Abstract

In this paper, we study rational functions of q-Racah type and a multivariate extension, using representation theory of Uq(sl2). Eigenfunctions of twisted primitive elements in Uq(su2) can be expressed in terms of q-1-Krawtchouk polynomials. Using this, we show that overlap coefficients of solutions of a generalized eigenvalue problem (GEVP) and an eigenvalue problem (EVP) can be expressed in terms of a rational function of 43-type. With help of the quantum algebra, we derive (bi)orthogonality relations as well as a GEVP for these functions. Furthermore, using this new algebraic interpretation, we can exploit the co-algebra structure of Uq(sl2) to find a multivariate extension of these rational functions and derive biorthogonality relations and GEVPs for the multivariate functions. Then we repeat this procedure for the non-compact quantum algebra Uq(su1,1), where the q-1-Al-Salam--Chihara polynomials play the role of the q-1-Krawtchouk polynomials. As an application of the multivariate rational functions, we show that they appear as duality functions for certain interacting particle systems.