Finite-dimensional irreducible q-modules and their Drinfel'd polynomials

Abstract

Let F denote an algebraically closed field with characteristic 0, and let q denote a nonzero scalar in F that is not a root of unity. Let Z4 denote the cyclic group of order 4. Let q denote the unital associative F-algebra defined by generators \xi\i∈ Z4 and relations gather* qxixi+1-q-1xi+1xiq-q-1=1, \\ xi3xi+2-[3]qxi2xi+2xi+[3]qxixi+2xi2-xi+2xi3=0, gather* where [3]q=(q3-q-3)/(q-q-1). There exists an automorphism of q that sends xi xi+1 for i∈ Z4. Let V denote a finite-dimensional irreducible q-module of type 1. To V we attach a polynomial called the Drinfel'd polynomial. In our main result, we explain how the following are related: (i) the Drinfel'd polynomial for the q-module V; (ii) the Drinfel'd polynomial for the q-module V twisted via . Specifically, we show that the roots of (i) are the inverses of the roots of (ii). We discuss how q is related to the quantum loop algebra Uq(L(sl2)), its positive part Uq+, the q-tetrahedron algebra q, and the q-geometric tridiagonal pairs.