Integrable Models Associated to Classical Representations of Uq(sl(n))

Abstract

We describe a representation for Uq(sl(n)), when q is not a root of unity, based on the fundamental representation of sl(n). As Uq(sl(n)) has a Hopf algebra structure with a non-commutative co-product, we look for a intertwine matrix R that relates two possible definitions of that co-product. We solve cases for n=2 and n=3, and then we generalize for any n. We obtain the hamiltonian associated to such matrix R, corresponding to a multi-state chain. As the case for n=2 corresponds to the XXZ model with spin 1/2, for n>2 we have the generalization of the XXZ model to sl(n). We show the case for n=3 and its solution by Bethe ansatz.

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