Analytical results for the low-temperature Drude weight of the XXZ spin chain

Abstract

The spin-1/2 XXZ chain is an integrable lattice model and parts of its spin current can be protected by local conservation laws for anisotropies -1<<1. In this case, the Drude weight D(T) is non-zero at finite temperatures T. Here we obtain analytical results for D(T) at low temperatures for zero external magnetic field and anisotropies =(nπ/m) with n,m coprime integers, using the thermodynamic Bethe ansatz. We show that to leading orders D(T)=D(0)-a()T2K-2-b1()T2 where K is the Luttinger parameter and the prefactor a(), obtained in closed form, has a fractal structure as function of anisotropy . The prefactor b1(), on the other hand, does not have a fractal structure and can be obtained in a standard field-theoretical approach. Including both temperature corrections, we obtain an analytic result for the low-temperature asymptotics of the Drude weight in the entire regime -1<=(nπ/m)<1.