Analytical results on the Heisenberg spin chain in a magnetic field

Abstract

We obtain the ground state magnetization of the Heisenberg and XXZ spin chains in a magnetic field h as a series in hc-h, where hc is the smallest field for which the ground state is fully polarized. All the coefficients of the series can be computed in closed form through a recurrence formula that involves only algebraic manipulations. The radius of convergence of the series in the full range 0<h≤ hc is studied numerically. To that end we express the free energy at mean magnetization per site -1/2≤ σzi≤ 1/2 as a series in 1/2- σzi whose coefficients can be similarly recursively computed in closed form. This series converges for all 0≤ σzi≤ 1/2. The recurrence is nothing but the Bethe equations when their roots are written as a double series in their corresponding Bethe number and in 1/2- σzi. It can also be used to derive the corrections in finite size, that correspond to the spectrum of a free compactified boson whose radius can be expanded as a similar series. The method presumably applies to a large class of models: it also successfully applies to a case where the Bethe roots lie on a curve in the complex plane.