Gelfand-Tsetlin Bases for Elliptic Quantum Groups

Abstract

We study the level-0 representations of the elliptic quantum group Uq,p(glN). We give a classification theorem of the finite-dimensional irreducible representations of Uq,p(glN) in terms of the theta function analogue of the Drinfeld polynomial for the quantum affine algebra Uq(glN). We also construct the Gelfand-Tsetlin bases for the level-0 Uq,p(glN)-modules following the work by Nazarov-Tarasov for the Yangian Y(glN)-modules. This is a construction in terms of the Drinfeld generators. For the case of tensor product of the vector representations, we give another construction of the Gelfand-Tsetlin bases in terms of the L-operators and make a connection between the two constructions. We also compare them with those obtained by the first author by using the Sn-action realized by the elliptic dynamical R-matrix on the standard bases. As a byproduct, we obtain an explicit formula for the partition functions of the corresponding 2-dimensional square lattice model in terms of the elliptic weight functions of type AN-1.