A generating function associated with the alternating elements in the positive part of Uq(sl2)

Abstract

The positive part Uq+ of Uq(sl2) admits an embedding into a q-shuffle algebra. This embedding was introduced by M. Rosso in 1995. In 2019, Terwilliger introduced the alternating elements \W-n\n ∈ N, \Wn+1\n ∈ N, \Gn+1\n ∈ N, \Gn+1\n ∈ N in Uq+ using the Rosso embedding. He showed that the alternating elements \W-n\n ∈ N, \Wn+1\n ∈ N, \Gn+1\n ∈ N form a PBW basis for Uq+, and he expressed \Gn+1\n ∈ N in this alternating PBW basis. In his calculation, Terwilliger used some elements \Dn\n ∈ N with the following property: the generating function D(t)=Σn ∈ NDntn is the multiplicative inverse of the generating function G(t)=Σn ∈ NGntn where G0=1. Terwilliger defined \Dn\n ∈ N recursively; in this paper, we will express \Dn\n ∈ N in closed form.