Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect
Topological phases of matter are distinguished by topological invariants, such as Chern numbers and topological spins, that quantize their response to electromagnetic currents and changes of ambient geometry. Intriguingly, in the ν = 2/5 fractional quantum Hall effect, prominent theoretical approach...
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sg-ntu-dr.10356-1476712023-02-28T19:28:27Z Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect Yang, Bo Wu, Ying-Hai Papić, Zlatko School of Physical and Mathematical Sciences Physics and Applied Physics Science::Physics Fractional Quantum Hall Effect Topological Materials Topological phases of matter are distinguished by topological invariants, such as Chern numbers and topological spins, that quantize their response to electromagnetic currents and changes of ambient geometry. Intriguingly, in the ν = 2/5 fractional quantum Hall effect, prominent theoretical approaches—the composite fermion theory and conformal field theory—have constructed two distinct states, the Jain composite fermion (CF) state and the Gaffnian state, for which many of the topological indices coincide and even the microscopic ground-state wave functions have high overlap with each other in system sizes accessible to numerics. At the same time, some aspects of these states are expected to be very different; e.g., their elementary excitations should have either Abelian (CF) or non-Abelian (Gaffnian) statistics. In this paper we investigate the close relationship between these two states by considering not only their ground states, but also the low-energy charged excitations. We show that the low-energy physics of both phases is spanned by the same type of quasielectrons of the neighboring Laughlin phase. The main difference between the two states arises due to an implicit assumption of short-range interaction in the CF approach, which causes a large splitting of the variational energies of the Gaffnian excitations. We thus propose that the Jain phase emerges as an effective Abelian low-energy description of the Gaffnian phase when the Hamiltonian is dominated by two-body interactions of sufficiently short range. National Research Foundation (NRF) Published version This work is supported by the NTU grant for Nanyang Assistant Professorship. ZP acknowledges support by EPSRC grant EP/R020612/1. Statement of compliance with EPSRC policy framework on research data: This publication is theoretical work that does not require supporting research data. 2021-04-21T05:56:19Z 2021-04-21T05:56:19Z 2019 Journal Article Yang, B., Wu, Y. & Papić, Z. (2019). Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect. Physical Review B, 100, 245303-1-245303-11. https://dx.doi.org/10.1103/PhysRevB.100.245303 2469-9969 https://hdl.handle.net/10356/147671 10.1103/PhysRevB.100.245303 100 245303-1 245303-11 en NTU grant for Nanyang assistant professorship Physical Review B © 2019 American Physical Society (APS). All rights reserved. This paper was published in Physical Review B and is made available with permission of American Physical Society (APS). application/pdf |
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Science::Physics Fractional Quantum Hall Effect Topological Materials Yang, Bo Wu, Ying-Hai Papić, Zlatko Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect |
| description |
Topological phases of matter are distinguished by topological invariants, such as Chern numbers and topological spins, that quantize their response to electromagnetic currents and changes of ambient geometry. Intriguingly, in the ν = 2/5 fractional quantum Hall effect, prominent theoretical approaches—the composite fermion theory and conformal field theory—have constructed two distinct states, the Jain composite fermion (CF) state and the Gaffnian state, for which many of the topological indices coincide and even the microscopic ground-state wave functions have high overlap with each other in system sizes accessible to numerics. At the same time, some aspects of these states are expected to be very different; e.g., their elementary excitations should have either Abelian (CF) or non-Abelian (Gaffnian) statistics. In this paper we investigate the close relationship between these two states by considering not only their ground states, but also the low-energy charged excitations. We show that the low-energy physics of both phases is spanned by the same type of quasielectrons of the neighboring Laughlin phase. The main difference between the two states arises due to an implicit assumption of short-range interaction in the CF approach, which causes a large splitting of the variational energies of the Gaffnian excitations. We thus propose that the Jain phase emerges as an effective Abelian low-energy description of the Gaffnian phase when the Hamiltonian is dominated by two-body interactions of sufficiently short range. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Yang, Bo Wu, Ying-Hai Papić, Zlatko |
| format |
Article |
| author |
Yang, Bo Wu, Ying-Hai Papić, Zlatko |
| author_sort |
Yang, Bo |
| title |
Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect |
| title_short |
Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect |
| title_full |
Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect |
| title_fullStr |
Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect |
| title_full_unstemmed |
Effective Abelian theory from a non-Abelian topological order in the ν = 2/5 fractional quantum Hall effect |
| title_sort |
effective abelian theory from a non-abelian topological order in the ν = 2/5 fractional quantum hall effect |
| publishDate |
2021 |
| url |
https://hdl.handle.net/10356/147671 |
| _version_ |
1759856312549638144 |