Integrable open-boundary conditions for the supersymmetric t-J model. The quantum group invariant case
Abstract
We consider integrable open--boundary conditions for the supersymmetric t--J model commuting with the number operator n and Sz. Four families, each one depending on two arbitrary parameters, are found. We find the relation between Sklyanin's method of constructing open boundary conditions and the one for the quantum group invariant case based on Markov traces. The eigenvalue problem is solved for the new cases by generalizing the Nested Algebraic Bethe ansatz of the quantum group invariant case (which is obtained as a special limit). For the quantum group invariant case the Bethe ansatz states are shown to be highest weights of splq(2,1).
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