Absence of a classical long-range order in S=1/2 Heisenberg antiferromagnet on triangular lattice

Abstract

We study the quantum phase transition of an S=1/2 anisotropic α ( Jz/Jxy) Heisenberg antiferromagnet on a triangular lattice. We calculate the sublattice magnetization and the long-range helical order-parameter and their Binder ratios on finite systems with N ≤ 36 sites. The N dependence of the Binder ratios reveals that the classical 120 N\'eel state occurs for α 0.55, whereas a critical collinear state occurs for 1/α 0.6. This result is at odds with a widely-held belief that the ground state of a Heisenberg antiferromagnet is the 120 N\'eel state, but it also provides a possible mechanism explaining experimentally observed spin liquids.