The q-Onsager Algebra and the Quantum Torus

Abstract

The q-Onsager algebra, denoted Oq, is defined by two generators W0, W1 and two relations called the q-Dolan-Grady relations. Recently, Terwilliger introduced some elements of Oq, said to be alternating. These elements are denoted \W-k\k=0∞, \Wk+1\k=0∞, \Gk+1\k=0∞, \Gk+1\k=0∞. The alternating elements of Oq are defined recursively. By construction, they are polynomials in W0 and W1. It is currently unknown how to express these polynomials in closed form. In this paper, we consider an algebra Tq, called the quantum torus. We present a basis for Tq and define an algebra homomorphism p: Oq Tq. In our main result, we express the p-images of the alternating elements of Oq in the basis for Tq. These expressions are in a closed form that we find attractive.