Abstract
We present a thorough analysis of the non-intersecting string (NIS) model and its exact solution. This is an integrable q-states vertex model describing configurations of non-intersecting polygons on the lattice. The exact eigenvalues of the transfer matrix are found by the analytic Bethe ansatz. The Bethe ansatz equations thus found are shown to be equivalent to those for a mixed spin model involving both 1 2 and infinite spin. This indicates that the NIS model provides a representation of the quantum group SU(2) q ̂ (| q ̂ | ≠ 1) corresponding to spins s = 1 2 and s = ∞. The partition function and the excitations in the thermodynamic limit are computed.
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