An Elliptic Algebra Uq,p(sl2) and the Fusion RSOS Model

Abstract

We introduce an elliptic algebra Uq,p(sl2) with p=q2r (r∈ >0) and present its free boson representation at generic level k. We show that this algebra governs a structure of the space of states in the k-fusion RSOS model specified by a pair of positive integers (r,k), or equivalently a q-deformation of the coset conformal field theory SU(2)k× SU(2)r-k-2/SU(2)r-2. Extending the work by Lukyanov and Pugai corresponding to the case k=1, we gives a full set of screening operators for k>1. The algebra Uq,p(sl2) has two interesting degeneration limits, p 0 and p 1. The former limit yields the quantum affine algebra Uq(sl2) whereas the latter yields the algebra A,η(sl2), the scaling limit of the elliptic algebra Aq,p(sl2). Using this correspondence, we also obtain the highest component of two types of vertex operators which can be regarded as q-deformations of the primary fields in the coset conformal field theory.

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