A $\Gamma$-matrix generalization of the Kitaev model

Congjun Wu; Daniel Arovas; Hsiang-Hsuan Hung

doi:10.1103/PhysRevB.79.134427

A $\Gamma$-matrix generalization of the Kitaev model

Mesoscale and Nanoscale Physics 2009-09-09 v4

Authors: Congjun Wu , Daniel Arovas , Hsiang-Hsuan Hung

View on arXiv ↗ PDF ↗ DOI ↗

Abstract

We extend the Kitaev model defined for the Pauli-matrices to the Clifford algebra of $\Gamma$ -matrices, taking the $4 \times 4$ representation as an example. On a decorated square lattice, the ground state spontaneously breaks time-reversal symmetry and exhibits a topological phase transition. The topologically non-trivial phase carries gapless chiral edge modes along the sample boundary. On the 3D diamond lattice, the ground states can exhibit gapless 3D Dirac cone-like excitations and gapped topological insulating states. Generalizations to even higher rank $\Gamma$ -matrices are also discussed.

Keywords

topological phases positive maps in quantum information

Cite

@article{arxiv.0811.1380,
  title  = {A $\Gamma$-matrix generalization of the Kitaev model},
  author = {Congjun Wu and Daniel Arovas and Hsiang-Hsuan Hung},
  journal= {arXiv preprint arXiv:0811.1380},
  year   = {2009}
}

Comments

A revised version

Related papers

View all related →