Thermal Ising transition in the spin-1/2 J1-J2 Heisenberg model

Abstract

Using an SU(2) invariant finite-temperature tensor network algorithm, we provide strong numerical evidence in favor of an Ising transition in the collinear phase of the spin-1/2 J1-J2 Heisenberg model on the square lattice. In units of J2, the critical temperature reaches a maximal value of Tc/J2 0.18 around J2/J1 1.0. It is strongly suppressed upon approaching the zero-temperature boundary of the collinear phase J2/J1 0.6, and it vanishes as 1/(J2/J1) in the large J2/J1 limit, as predicted by Chandra, Coleman and Larkin [Phys. Rev. Lett. 64, 88, 1990]. Enforcing the SU(2) symmetry is crucial to avoid the artifact of finite-temperature SU(2) symmetry breaking of U(1) algorithms, opening new perspectives in the investigation of the thermal properties of quantum Heisenberg antiferromagnets.