A frustrated spin-1/2 Heisenberg antiferromagnet on a chevron-square lattice

Abstract

The coupled cluster method (CCM) is used to study the zero-temperature properties of a frustrated spin-half (s=12) J1--J2 Heisenberg antiferromagnet (HAF) on a 2D chevron-square lattice. Each site on an underlying square lattice has 4 nearest-neighbor exchange bonds of strength J1>0 and 2 next-nearest-neighbor (diagonal) bonds of strength J2 x J1>0, with each square plaquette having only one diagonal bond. The diagonal bonds form a chevron pattern, and the model thus interpolates smoothly between 2D HAFs on the square (x=0) and triangular (x=1) lattices, and also extrapolates to disconnected 1D HAF chains (x ∞). The classical (s ∞) version of the model has N\'eel order for 0 < x < x cl and a form of spiral order for x cl < x < ∞, where x cl = 12. For the s=12 model we use both these classical states, as well as other collinear states not realized as classical ground-state (GS) phases, as CCM reference states, on top of which the multispin-flip configurations resulting from quantum fluctuations are incorporated in a systematic truncation scheme, which we carry out to high orders and extrapolate to the physical limit. We calculate the GS energy, GS magnetic order parameter, and the susceptibilities of the states to various forms of valence-bond crystalline (VBC) order, including plaquette and two different dimer forms. We find that the s=12 model has two quantum critical points, at xc1 ≈ 0.72(1) and xc2 ≈ 1.5(1), with N\'eel order for 0 < x < xc1, a form of spiral order for xc1 < x < xc2 that includes the correct three-sublattice 120 spin ordering for the triangular-lattice HAF at x=1, and parallel-dimer VBC order for xc2 < x < ∞.