Scalar products and norm of Bethe vectors in o2n+1 invariant integrable models
Abstract
We compute scalar products of off-shell Bethe vectors in models with o2n+1 symmetry. The scalar products are expressed as a sum over partitions of the Bethe parameter sets, the building blocks being the so-called highest coefficients. We prove some recurrence relations and a residue theorem for these highest coefficients, and prove that they are consistent with the reduction to gln invariant models. We also express the norm of on-shell Bethe vectors as a Gaudin determinant.
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