Towards a complete classification of non-chiral topological phases in 2D fermion systems
- URL: http://arxiv.org/abs/2112.06124v3
- Date: Thu, 24 Oct 2024 20:02:23 GMT
- Title: Towards a complete classification of non-chiral topological phases in 2D fermion systems
- Authors: Jing-Ren Zhou, Qing-Rui Wang, Zheng-Cheng Gu,
- Abstract summary: We argue that all non-chiral fermionic topological phases in 2+1D are characterized by a set of tensors $(Nij_k,Fij_k,Fijm,alphabeta_kln,chidelta,n_i,d_i)$.
Several examples with q-type anyon excitations are discussed, including the Fermionic topological phase from Tambara-gami category for $mathbbZ_2N$.
- Score: 29.799668287091883
- License:
- Abstract: In recent years, fermionic topological phases of quantum matter has attracted a lot of attention. In a pioneer work by Gu, Wang and Wen, the concept of equivalence classes of fermionic local unitary(FLU) transformations was proposed to systematically understand non-chiral topological phases in 2D fermion systems and an incomplete classification was obtained. On the other hand, the physical picture of fermion condensation and its corresponding super pivotal categories give rise to a generic mathematical framework to describe fermionic topological phases of quantum matter. In particular, it has been pointed out that in certain fermionic topological phases, there exists the so-called q-type anyon excitations, which have no analogues in bosonic theories. In this paper, we generalize the Gu, Wang and Wen construction to include those fermionic topological phases with q-type anyon excitations. We argue that all non-chiral fermionic topological phases in 2+1D are characterized by a set of tensors $(N^{ij}_{k},F^{ij}_{k},F^{ijm,\alpha\beta}_{kln,\chi\delta},n_{i},d_{i})$, which satisfy a set of nonlinear algebraic equations parameterized by phase factors $\Xi^{ijm,\alpha\beta}_{kl}$, $\Xi^{ij}_{kln,\chi\delta}$, $\Omega^{kim,\alpha\beta}_{jl}$ and $\Omega^{ki}_{jln,\chi\delta}$. Moreover, consistency conditions among algebraic equations give rise to additional constraints on these phase factors which allow us to construct a topological invariant partition for an arbitrary triangulation of 3D spin manifold. Finally, several examples with q-type anyon excitations are discussed, including the Fermionic topological phase from Tambara-Yamagami category for $\mathbb{Z}_{2N}$, which can be regarded as the $\mathbb{Z}_{2N}$ parafermion generalization of Ising fermionic topological phase.
Related papers
- Gapless Floquet topology [40.2428948628001]
We study the existence of topological edge zero- and pi-modes despite the lack of bulk gaps in the quasienergy spectrum.
We numerically study the effect of interactions, which give a finite lifetime to the edge modes in the thermodynamic limit with the decay rate consistent with Fermi's Golden Rule.
arXiv Detail & Related papers (2024-11-04T19:05:28Z) - Exactly solvable models for fermionic symmetry-enriched topological phases and fermionic 't Hooft anomaly [33.49184078479579]
The interplay between symmetry and topological properties plays a very important role in modern physics.
How to realize all these fermionic SET (fSET) phases in lattice models remains to be a difficult open problem.
arXiv Detail & Related papers (2024-10-24T19:52:27Z) - Topological holography for fermions [2.064157605420738]
Topological holography is conjectured to capture the topological aspects of symmetry in gapped and gapless systems.
We extend the SymTFT framework to establish a topological holography correspondence for fermionic systems.
arXiv Detail & Related papers (2024-04-29T18:00:02Z) - Symmetry-protected topological phases, conformal criticalities, and duality in exactly solvable SO($n$) spin chains [0.0]
We introduce a family of SO($n$)-symmetric spin chains which generalize the transverse-field Ising chain for $n=1$.
Their phase diagrams include a critical point described by the $mathrmSpin(n)_1$ conformal field theory.
arXiv Detail & Related papers (2023-05-05T09:47:11Z) - Thermoelectric properties of topological chains coupled to a quantum dot [40.19796930944118]
Topological one-dimensional superconductors can sustain in their extremities zero energy modes that are protected by different kinds of symmetries.
We consider the simplest kind of topological insulators, namely chains of atoms with hybridized $sp$ orbitals.
We show that the electrical conductance and the Wiedemann-Franz ratio of the device at the topological transition have universal values at very low temperatures.
arXiv Detail & Related papers (2021-12-20T22:52:00Z) - Topological transitions with continuously monitored free fermions [68.8204255655161]
We show the presence of a topological phase transition that is of a different universality class than that observed in stroboscopic projective circuits.
We find that this entanglement transition is well identified by a combination of the bipartite entanglement entropy and the topological entanglement entropy.
arXiv Detail & Related papers (2021-12-17T22:01:54Z) - Gravitational anomaly of 3+1 dimensional Z_2 toric code with fermionic
charges and fermionic loop self-statistics [0.2578242050187029]
We introduce the notion of fermionic loop excitations in $3+1$ dimensional topological phases.
We show that the FcFl phase can only exist at the boundary of a non-trivial 4+1d invertible bosonic, stable without any symmetries.
We also show that the FcFl phase has the same gravitational anomaly as all-fermion quantum electrodynamics.
arXiv Detail & Related papers (2021-10-27T18:00:01Z) - Exactly Solvable Lattice Hamiltonians and Gravitational Anomalies [3.9752110899603053]
We present Hamiltonian models for bosonic beyond group cohomology invertible topological phases of order two and four in any spacetime dimensions.
Examples include the beyond group cohomology invertible phase without symmetry in (4+1)D that has an anomalous boundary $mathbbZ$ topological order.
We argue that this construction gives a new non-trivial quantum cellular automaton (QCA) in (4+1)D of order two.
arXiv Detail & Related papers (2021-10-27T18:00:00Z) - Dynamical solitons and boson fractionalization in cold-atom topological
insulators [110.83289076967895]
We study the $mathbbZ$ Bose-Hubbard model at incommensurate densities.
We show how defects in the $mathbbZ$ field can appear in the ground state, connecting different sectors.
Using a pumping argument, we show that it survives also for finite interactions.
arXiv Detail & Related papers (2020-03-24T17:31:34Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.