On the Semi-Classical Limit of Scalar Products of the XXZ Spin Chain

Abstract

We study the scalar products between Bethe states in the XXZ spin chain with anisotropy ||>1 in the semi-classical limit where the length of the spin chain and the number of magnons tend to infinity with their ratio kept finite and fixed. Our method is a natural yet non-trivial generalization of similar methods developed for the XXX spin chain. The final result can be written in a compact form as a contour integral in terms of Faddeev's quantum dilogarithm function, which in the isotropic limit reduces to the classical dilogarithm function.