Abstract
We extend the recently developed Izergin–Korepin analysis on the wavefunctions of the U_q(\mathrm {sl}_2) six-vertex model to the reflecting boundary conditions. Based on the Izergin–Korepin analysis, we determine the exact forms of the symmetric functions which represent the wavefunctions and its dual. Comparison of the symmetric functions with the coordinate Bethe ansatz wavefunctions for the open XXZ chain by Alcaraz, Barber, Batchelor, Baxter, and Quispel is also made. As an application, we derive algebraic identities for the symmetric functions by combining the results with the determinant formula of the domain wall boundary partition function of the six-vertex model with reflecting end.
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