The elliptic algebra Uq,p(slN) and the Drinfeld realization of the elliptic quantum group Bq,λ(slN)
Abstract
By using the elliptic analogue of the Drinfeld currents in the elliptic algebra Uq,p(slN), we construct a L-operator, which satisfies the RLL-relations characterizing the face type elliptic quantum group Bq,λ(slN). For this purpose, we introduce a set of new currents Kj(v) (1≤ j≤ N) in Uq,p(slN). As in the N=2 case, we find a structure of Uq,p(slN) as a certain tensor product of Bq,λ(slN) and a Heisenberg algebra. In the level-one representation, we give a free field realization of the currents in Uq,p(slN). Using the coalgebra structure of Bq,λ(slN) and the above tensor structure, we derive a free field realization of the Uq,p(slN)-analogue of Bq,λ(slN)-intertwining operators. The resultant operators coincide with those of the vertex operators in the AN-1(1)-type face model.
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