Exact physical quantities of the D2(2) spin chain model with generic open boundary conditions
Abstract
We study the quantum integrable spin chain model associated with the twisted D2(2) algebra (or simply the D2(2) model) under generic open boundary conditions. The Hamiltonian of this model can be factorized into the sum of two staggered XXZ spin chains. Applying the t-W method, we derive the homogeneous Bethe ansatz equations for the zeros of the transfer matrix eigenvalues and the patterns of the corresponding zeros of the staggered XXZ spin chain with generic integrable boundaries. Based on these results, we analytically compute the surface energies and excitation energies of the D2(2) model in different regimes of boundary parameters.
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