Highest Weight $U_q[sl(n)]$ Modules and Invariant Integrable n-State Models with Periodic Boundary Conditions"

Details Highest Weight $U_q[sl(n)]$ Modules and Invariant Integrable n-State Models with Periodic Boundary Conditions" Highest Weight $U_q[sl(n)]$ Modules and Invariant Integrable n-State Models with Periodic Boundary Conditions"

1994-06-17

arxiv.org/abs/hep-th/9406116v1

J.Phys. A27 (1994) 7419-7424

Physics

High Energy Physics

High Energy Physics - Theory

5 pages, LaTeX, SFB 288 preprint

Scientific paper

10.1088/0305-4470/27/22/016

The weights are computed for the Bethe vectors of an RSOS type model with
periodic boundary conditions obeying $U_q[sl(n)]$ ($q=\exp(i\pi/r)$)
invariance. They are shown to be highest weight vectors. The q-dimensions of
the corresponding irreducible representations are obtained.

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