Finite-size corrections for ground states of the XXZ Heisenberg chain in the critical region

21 December 1985

journal article
Published by IOP Publishing in Journal of Physics A: General Physics

Vol. 18 (18) , L1133-L1137
https://doi.org/10.1088/0305-4470/18/18/004

Abstract

The methods of de Vega and Woynarovitch (1985) are used to calculate finite-size corrections to the ground state energy in different sectors for the XXZ Heisenberg chain, in the critical region -1< Delta <1. The finite-size scaling amplitude for the mass gap between the lowest lying sectors is derived. Using conformal invariance, the scaling dimension is extracted for an associated operator, corresponding to the electric field operator in the 8-vertex model. The conjecture of Baxter and Kelland (1974) for the electric field exponent is confirmed.

Keywords

This publication has 6 references indexed in Scilit:

Method for calculating finite size corrections in Bethe ansatz systems: Heisenberg chain and six-vertex model
Nuclear Physics B, 1985
Conformal invariance and universality in finite-size scaling
Journal of Physics A: General Physics, 1984
Spontaneous polarization of the eight-vertex model
Journal of Physics C: Solid State Physics, 1974
Vertical-Arrow Correlation Length in the Eight-Vertex Model and the Low-Lying Excitations of the $X - Y - Z$ Hamiltonian
Physical Review A, 1973
One-Dimensional Chain of Anisotropic Spin-Spin Interactions. II. Properties of the Ground-State Energy Per Lattice Site for an Infinite System
Physical Review B, 1966
One-Dimensional Chain of Anisotropic Spin-Spin Interactions. I. Proof of Bethe's Hypothesis for Ground State in a Finite System
Physical Review B, 1966