New Integrable Models from Fusion
Abstract
Integrable multistate or multiflavor/color models were recently introduced. They are generalizations of models corresponding to the defining representations of the Uq(sl(m)) quantum algebras. Here I show that a similar generalization is possible for all higher dimensional representations. The R-matrices and the Hamiltonians of these models are constructed by fusion. The sl(2) case is treated in some detail and the spin-0 and spin-1 matrices are obtained in explicit forms. This provides in particular a generalization of the Fateev-Zamolodchikov Hamiltonian.
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