Tarantino et al., 2016 - Google Patents
Discrete spin structures and commuting projector models for two-dimensional fermionic symmetry-protected topological phasesTarantino et al., 2016
View PDF- Document ID
- 4469657326770394657
- Author
- Tarantino N
- Fidkowski L
- Publication year
- Publication venue
- Physical Review B
External Links
Snippet
We construct exactly solved commuting projector Hamiltonian lattice models for all known (2+ 1)-dimensional (2+ 1D) fermionic symmetry protected topological phases (SPTs) with on- site unitary symmetry group G f= G× Z 2 f, where G is finite and Z 2 f is the fermion parity …
- 238000010276 construction 0 abstract description 14
Similar Documents
| Publication | Publication Date | Title |
|---|---|---|
| Tarantino et al. | Discrete spin structures and commuting projector models for two-dimensional fermionic symmetry-protected topological phases | |
| Yoshida | Topological color code and symmetry-protected topological phases | |
| Tovmasyan et al. | Preformed pairs in flat Bloch bands | |
| Chen et al. | Exact bosonization in two spatial dimensions and a new class of lattice gauge theories | |
| O'Brien et al. | Classification of gapless Z 2 spin liquids in three-dimensional Kitaev models | |
| Cheng | Fermionic Lieb-Schultz-Mattis theorems and weak symmetry-protected phases | |
| Douçot et al. | Physical implementation of protected qubits | |
| Teo et al. | Theory of twist liquids: Gauging an anyonic symmetry | |
| Barkeshli et al. | Twist defects and projective non-Abelian braiding statistics | |
| Bonderson | Measurement-only topological quantum computation via tunable interactions | |
| Huang et al. | Quantum circuit complexity of one-dimensional topological phases | |
| Burrello et al. | Topological phases in two-dimensional arrays of parafermionic zero modes | |
| US20140279822A1 (en) | Topological Quantum Computation via Tunable Interactions | |
| Teo | Globally symmetric topological phase: from anyonic symmetry to twist defect | |
| Wang et al. | Towards a complete classification of fermionic symmetry protected topological phases in 3D and a general group supercohomology theory | |
| Wang et al. | Foliated fracton order in the Majorana checkerboard model | |
| Mathai et al. | Global topology of Weyl semimetals and Fermi arcs | |
| Loring et al. | Almost commuting self-adjoint matrices: the real and self-dual cases | |
| Bridgeman et al. | Tensor networks with a twist: Anyon-permuting domain walls and defects in projected entangled pair states | |
| Jiang et al. | Generalized Lieb-Schultz-Mattis theorem on bosonic symmetry protected topological phases | |
| Wang et al. | Domain wall decorations, anomalies and spectral sequences in bosonic topological phases | |
| Kane et al. | Coupled wire model of Z 4 orbifold quantum Hall states | |
| Groenendijk et al. | Parafermion braiding in fractional quantum Hall edge states with a finite chemical potential | |
| MN et al. | Continuous limit of discrete quantum walks | |
| Chan et al. | Classification of symmetry-protected topological many-body localized phases in one dimension |