Ground-state properties of the K- model on a honeycomb lattice

Abstract

We investigate the ground-state properies of the K- model on a honeycomb lattice using series expansions and numerical exact diagonalizations, where the model includes Kitaev (K) and symmetric off-diagonal () interactions. Starting from the weakly interacting dimers on the specific bond, we strengthen the interdimer interactions to the isotropically interacting system. We show that depending on and K, the dimer state survives up to the isotropically interacting system, where the phase transition occurs, or obeys a phase transition to a magnetically ordered state at an anisotropic interaction. The results are summarized in the phase diagram. We also show that the Kekul\'e dimerized state is unstable in the isotropic K- model.