The scalar product of XXZ spin chain revisited. Application to the ground state at =-1/2

Abstract

For the scalar product Sn of the XXZ s=1/2 spin chain we derive a new determinant expression which is symmetric in the Bethe roots. We consider an application of this formula to the inhomogeneous groundstate of the model with =-1/2 with twisted periodic boundary conditions. At this point the ground state eigenvalue τn of the transfer matrix is known and has a simple form that does not contain the Bethe roots. We use the knowledge of τn(μ) to obtain a closed expression for the scalar product. The result is written in terms of Schur functions. The computations of the normalization of the ground state and the expectation value of σz are also presented.