Elliptic quantum groups and their finite-dimensional representations

Abstract

Let g be a complex semisimple Lie algebra, tau a point in the upper half-plane, and h a complex deformation parameter such that the image of h in the elliptic curve Etau is of infinite order. In this paper, we give an intrinsic definition of the category of finite-dimensional representations of the elliptic quantum group Eh,tau(g) associated to g. The definition is given in terms of Drinfeld half-currents and extends that given by Enriquez-Felder for g=sl2. When g=sln, it reproduces Felder's RLL definition via the Gauss decomposition obtained by Enriquez-Felder for n=2 and by the first author for n greater than 2. We classify the irreducible representations of Eh,tau in terms of elliptic Drinfeld polynomials, in close analogy to the case of the Yangian Yh(g) and quantum loop algebra Uq(Lg) of g. A crucial ingredient in the classification, which circumvents the fact that Eh,tau does not appear to admit Verma modules, is a functor from finite-dimensional representations of Uq(Lg) to those of Eh,tau which is an elliptic analogue of the monodromy functor constructed in our previous work arXiv:1310.7318. Our classification is new even for g=sl2, and holds more generally when g is a symmetrisable Kac-Moody algebra, provided finite-dimensionality is replaced by an integrability and category O condition.