On the Temperley-Lieb model
A Lima-Santos - arXiv preprint arXiv:1511.08509, 2015 - arxiv.org
arXiv preprint arXiv:1511.08509, 2015•arxiv.org
This work concerns the boundary integrability of the ${\cal {U}} _ {q}[osp (1| 2)] $ Temperley-
Lieb model. We constructed the solutions of the graded reflection equations in order to
determine the boundary terms of the correspondig spin-1 Hamiltonian. We obtain the
eigenvalue expressions as well as its associated Bethe ansatz equations by means of the
coordinate Bethe ansatz. These equations provide the complete description of the spectrum
of the model with diagonal integrable boundaries.
Lieb model. We constructed the solutions of the graded reflection equations in order to
determine the boundary terms of the correspondig spin-1 Hamiltonian. We obtain the
eigenvalue expressions as well as its associated Bethe ansatz equations by means of the
coordinate Bethe ansatz. These equations provide the complete description of the spectrum
of the model with diagonal integrable boundaries.
This work concerns the boundary integrability of the Temperley-Lieb model. We constructed the solutions of the graded reflection equations in order to determine the boundary terms of the correspondig spin-1 Hamiltonian. We obtain the eigenvalue expressions as well as its associated Bethe ansatz equations by means of the coordinate Bethe ansatz. These equations provide the complete description of the spectrum of the model with diagonal integrable boundaries.
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