Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiS
The family of topological materials has been growing rapidly but most members bare limitations hindering the study of exotic behaviour of topological particles. Here, Schoop et al. report a Fermi surface with a diamond-shaped line of Dirac nodes in ZrSiS, providing a promising candidate for studying...
| Main Authors: | , , , , , , , , , |
|---|---|
| Format: | Article |
| Language: | English |
| Published: |
Nature Publishing Group
2016-05-01
|
| Series: | Nature Communications |
| Online Access: | https://doi.org/10.1038/ncomms11696 |
| id |
doaj-cc8fef11520d4993b28755d78b9b08c0 |
|---|---|
| record_format |
Article |
| spelling |
doaj-cc8fef11520d4993b28755d78b9b08c02021-05-11T10:56:05ZengNature Publishing GroupNature Communications2041-17232016-05-01711710.1038/ncomms11696Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiSLeslie M. Schoop0Mazhar N. Ali1Carola Straßer2Andreas Topp3Andrei Varykhalov4Dmitry Marchenko5Viola Duppel6Stuart S. P. Parkin7Bettina V. Lotsch8Christian R. Ast9Max Planck Institute for Solid State ResearchMax Plank Institute for Microstructure PhysicsMax Planck Institute for Solid State ResearchMax Planck Institute for Solid State ResearchHelmholtz-Zentrum Berlin für Materialien und Energie, Elektronenspeicherring BESSY IIHelmholtz-Zentrum Berlin für Materialien und Energie, Elektronenspeicherring BESSY IIMax Planck Institute for Solid State ResearchMax Plank Institute for Microstructure PhysicsMax Planck Institute for Solid State ResearchMax Planck Institute for Solid State ResearchThe family of topological materials has been growing rapidly but most members bare limitations hindering the study of exotic behaviour of topological particles. Here, Schoop et al. report a Fermi surface with a diamond-shaped line of Dirac nodes in ZrSiS, providing a promising candidate for studying two-dimensional Dirac fermions.https://doi.org/10.1038/ncomms11696 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Leslie M. Schoop Mazhar N. Ali Carola Straßer Andreas Topp Andrei Varykhalov Dmitry Marchenko Viola Duppel Stuart S. P. Parkin Bettina V. Lotsch Christian R. Ast |
| spellingShingle |
Leslie M. Schoop Mazhar N. Ali Carola Straßer Andreas Topp Andrei Varykhalov Dmitry Marchenko Viola Duppel Stuart S. P. Parkin Bettina V. Lotsch Christian R. Ast Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiS Nature Communications |
| author_facet |
Leslie M. Schoop Mazhar N. Ali Carola Straßer Andreas Topp Andrei Varykhalov Dmitry Marchenko Viola Duppel Stuart S. P. Parkin Bettina V. Lotsch Christian R. Ast |
| author_sort |
Leslie M. Schoop |
| title |
Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiS |
| title_short |
Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiS |
| title_full |
Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiS |
| title_fullStr |
Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiS |
| title_full_unstemmed |
Dirac cone protected by non-symmorphic symmetry and three-dimensional Dirac line node in ZrSiS |
| title_sort |
dirac cone protected by non-symmorphic symmetry and three-dimensional dirac line node in zrsis |
| publisher |
Nature Publishing Group |
| series |
Nature Communications |
| issn |
2041-1723 |
| publishDate |
2016-05-01 |
| description |
The family of topological materials has been growing rapidly but most members bare limitations hindering the study of exotic behaviour of topological particles. Here, Schoop et al. report a Fermi surface with a diamond-shaped line of Dirac nodes in ZrSiS, providing a promising candidate for studying two-dimensional Dirac fermions. |
| url |
https://doi.org/10.1038/ncomms11696 |
| work_keys_str_mv |
AT lesliemschoop diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT mazharnali diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT carolastraßer diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT andreastopp diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT andreivarykhalov diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT dmitrymarchenko diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT violaduppel diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT stuartspparkin diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT bettinavlotsch diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis AT christianrast diracconeprotectedbynonsymmorphicsymmetryandthreedimensionaldiraclinenodeinzrsis |
| _version_ |
1721447335555235840 |