Friday, November 9, 2012

1211.1735 (Yu-Wen Lee et al.)

Stability of three-sublattice order in S=1 bilinear-biquadratic
Heisenberg Model on anisotropic triangular lattices
   [PDF]

Yu-Wen Lee, Yung-Chung Chen, Min-Fong Yang
The S=1 bilinear-biquadratic Heisenberg model on anisotropic triangular lattices is investigated by several complementary methods. Our focus is on the stability of the three-sublattice spin nematic state against spatial anisotropy. We find that, deviated from the case of isotropic triangular lattice, quantum fluctuations enhance and the three-sublattice spin nematic order is reduced. In the limit of weakly coupling chains, by mapping the systems to an effective one-dimensional model, we show that the three-sublattice spin nematic order develops at infinitesimal interchain coupling. Our results provide a complete picture for smooth crossover from the triangular-lattice case to both the square-lattice and the one-dimensional limits.
View original: http://arxiv.org/abs/1211.1735

No comments:

Post a Comment