Magnetic order and disorder in the frustrated quantum Heisenberg antiferromagnet in two dimensions

TL;DR

This study uses exact diagonalization to analyze the ground state magnetic properties of the frustrated $J_1-J_2$ quantum Heisenberg antiferromagnet on a square lattice, identifying regions with and without magnetic order.

Contribution

It provides a detailed finite-size scaling analysis of magnetic order parameters and susceptibility, revealing the phase diagram and the existence of a nonmagnetic region in the model.

Findings

Néel order for $J_2/J_1 < 0.34$

Collinear order for $J_2/J_1 > 0.68$

Existence of a nonmagnetic phase between these regions

Abstract

We have performed a numerical investigation of the ground state properties of the frustrated quantum Heisenberg antiferromagnet on the square lattice (``$J_1-J_2$ model''), using exact diagonalization of finite clusters with 16, 20, 32, and 36 sites. Using a finite-size scaling analysis we obtain results for a number of physical properties: magnetic order parameters, ground state energy, and magnetic susceptibility (at $q=0$). For the unfrustrated case these results agree with series expansions and quantum Monte Carlo calculations to within a percent or better. In order to assess the reliability of our calculations, we also investigate regions of parameter space with well-established magnetic order, in particular the non-frustrated case $J_2<0$. We find that in many cases, in particular for the intermediate region $0.3 < J_2/J_1 < 0.7$, the 16 site cluster shows anomalous finite size effects. Omitting this cluster from the analysis, our principal result is that there is N\'eel type order for $J_2/J_1 < 0.34$ and collinear magnetic order (wavevector $\bbox{Q}=(0,\pi)$) for $J_2/J_1 > 0.68$. There thus is a region in parameter space without any form of magnetic order. Including the 16 site cluster, or analyzing the independently calculated magnetic susceptibility we arrive at the same conclusion, but with modified values for the range of existence of the nonmagnetic region. We also find numerical values for the spin-wave velocity and the spin stiffness. The spin-wave velocity remains finite at the magnetic-nonmagnetic transition, as expected from the nonlinear sigma