The Quantum Compass Model on the Square Lattice
摘要
Using exact diagonalizations, Green's function Monte Carlo simulations and high-order perturbation theory, we study the low-energy properties of the two-dimensional spin-1/2 compass model on the square lattice defined by the Hamiltonian . When , we show that, on clusters of dimension , the low-energy spectrum consists of states which collapse onto each other exponentially fast with , a conclusion that remains true arbitrarily close to . At that point, we show that an even larger number of states collapse exponentially fast with onto the ground state, and we present numerical evidence that this number is precisely . We also extend the symmetry analysis of the model to arbitrary spins and show that the two-fold degeneracy of all eigenstates remains true for arbitrary half-integer spins but does not apply to integer spins, in which cases eigenstates are generically non degenerate, a result confirmed by exact diagonalizations in the spin-1 case. Implications for Mott insulators and Josephson junction arrays are briefly discussed.
引用
@article{arxiv.cond-mat/0501708,
title = {The Quantum Compass Model on the Square Lattice},
author = {J. Dorier and F. Becca and F. Mila},
journal= {arXiv preprint arXiv:cond-mat/0501708},
year = {2009}
}
备注
8 pages, 8 figures