Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization
This paper concerns the Z2 classification of Fermionic Time-Reversal (FTR) symmetric partial differential Hamiltonians on the Euclidean plane. We consider the setting of two insulators separated by an interface. Hamiltonians that are invariant with respect to spatial translations along the interface...
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sg-ntu-dr.10356-1806872024-10-21T02:09:19Z Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization Bal, Guillaume Wang, Zhongjian School of Physical and Mathematical Sciences Mathematical Sciences Topological insulators Fermionic time reversal symmetry This paper concerns the Z2 classification of Fermionic Time-Reversal (FTR) symmetric partial differential Hamiltonians on the Euclidean plane. We consider the setting of two insulators separated by an interface. Hamiltonians that are invariant with respect to spatial translations along the interface are classified into two categories depending on whether they may or may not be gapped by continuous deformations. Introducing a related odd-symmetric Fredholm operator, we show that the classification is stable against FTR-symmetric perturbations. The property that non-trivial Hamiltonians cannot be gapped may be interpreted as a topological obstruction to Anderson localization: no matter how much (spatially compactly supported) perturbations are present in the system, a certain amount of transmission in both directions is guaranteed in the nontrivial phase. We present a scattering theory for such systems and show numerically that transmission is indeed guaranteed in the presence of FTR-symmetric perturbations while it no longer is for non-symmetric fluctuations. Nanyang Technological University The research of G B is partially supported by the US National Science Foundation Grants DMS-2306411 and DMS-1908736. The research of Z W is partially supported by NTU-SUG 023162-00001. 2024-10-21T02:09:18Z 2024-10-21T02:09:18Z 2024 Journal Article Bal, G. & Wang, Z. (2024). Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization. Journal of Physics A: Mathematical and Theoretical, 57(28), 285202-. https://dx.doi.org/10.1088/1751-8121/ad5523 1751-8113 https://hdl.handle.net/10356/180687 10.1088/1751-8121/ad5523 2-s2.0-85197643517 28 57 285202 en NTU-SUG 023162-00001 Journal of Physics A: Mathematical and Theoretical © 2024 IOP Publishing Ltd. All rights reserved. |
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Mathematical Sciences Topological insulators Fermionic time reversal symmetry |
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Mathematical Sciences Topological insulators Fermionic time reversal symmetry Bal, Guillaume Wang, Zhongjian Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization |
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This paper concerns the Z2 classification of Fermionic Time-Reversal (FTR) symmetric partial differential Hamiltonians on the Euclidean plane. We consider the setting of two insulators separated by an interface. Hamiltonians that are invariant with respect to spatial translations along the interface are classified into two categories depending on whether they may or may not be gapped by continuous deformations. Introducing a related odd-symmetric Fredholm operator, we show that the classification is stable against FTR-symmetric perturbations. The property that non-trivial Hamiltonians cannot be gapped may be interpreted as a topological obstruction to Anderson localization: no matter how much (spatially compactly supported) perturbations are present in the system, a certain amount of transmission in both directions is guaranteed in the nontrivial phase. We present a scattering theory for such systems and show numerically that transmission is indeed guaranteed in the presence of FTR-symmetric perturbations while it no longer is for non-symmetric fluctuations. |
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School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Bal, Guillaume Wang, Zhongjian |
| format |
Article |
| author |
Bal, Guillaume Wang, Zhongjian |
| author_sort |
Bal, Guillaume |
| title |
Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization |
| title_short |
Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization |
| title_full |
Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization |
| title_fullStr |
Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization |
| title_full_unstemmed |
Z2 classification of FTR symmetric differential operators and obstruction to Anderson localization |
| title_sort |
z2 classification of ftr symmetric differential operators and obstruction to anderson localization |
| publishDate |
2024 |
| url |
https://hdl.handle.net/10356/180687 |
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1814777756105310208 |