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Topology in the 2d Heisenberg Model under Gradient Flow
The 2d Heisenberg model — or 2d O(3) model — is popular in condensed matter physics, and in particle physics as a toy model for QCD. Along with other analogies, it shares with 4d Yang-Mills theories, and with QCD, the property that the configurations are divided in topological sectors. In the lattic...
| Autores principales: | , , , , |
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| Lenguaje: | eng |
| Publicado: |
2017
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| Materias: | |
| Acceso en línea: | https://dx.doi.org/10.1088/1742-6596/912/1/012024 http://cds.cern.ch/record/2289184 |
| _version_ | 1780956245226684416 |
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| author | Sandoval, Ilya O. Bietenholz, Wolfgang de Forcrand, Philippe Gerber, Urs Mejía-Díaz, Héctor |
| author_facet | Sandoval, Ilya O. Bietenholz, Wolfgang de Forcrand, Philippe Gerber, Urs Mejía-Díaz, Héctor |
| author_sort | Sandoval, Ilya O. |
| collection | CERN |
| description | The 2d Heisenberg model — or 2d O(3) model — is popular in condensed matter physics, and in particle physics as a toy model for QCD. Along with other analogies, it shares with 4d Yang-Mills theories, and with QCD, the property that the configurations are divided in topological sectors. In the lattice regularisation the topological charge Q can still be defined such that $Q\in \mathbb{Z}$. It has generally been observed, however, that the topological susceptibility ${{\chi }_{t}}=\langle {{Q}^{2}}\rangle /V$ does not scale properly in the continuum limit, i.e. that the quantity ${{\chi }_{t}}{{\xi }^{2}}$ diverges for ξ → ∞ (where ξ is the correlation length in lattice units). Here we address the question whether or not this divergence persists after the application of the Gradient Flow. |
| id | cern-2289184 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 2017 |
| record_format | invenio |
| spelling | cern-22891842023-03-14T20:14:00Zdoi:10.1088/1742-6596/912/1/012024http://cds.cern.ch/record/2289184engSandoval, Ilya O.Bietenholz, Wolfgangde Forcrand, PhilippeGerber, UrsMejía-Díaz, HéctorTopology in the 2d Heisenberg Model under Gradient Flowhep-phParticle Physics - Phenomenologycond-mat.stat-mechhep-latParticle Physics - LatticeThe 2d Heisenberg model — or 2d O(3) model — is popular in condensed matter physics, and in particle physics as a toy model for QCD. Along with other analogies, it shares with 4d Yang-Mills theories, and with QCD, the property that the configurations are divided in topological sectors. In the lattice regularisation the topological charge Q can still be defined such that $Q\in \mathbb{Z}$. It has generally been observed, however, that the topological susceptibility ${{\chi }_{t}}=\langle {{Q}^{2}}\rangle /V$ does not scale properly in the continuum limit, i.e. that the quantity ${{\chi }_{t}}{{\xi }^{2}}$ diverges for ξ → ∞ (where ξ is the correlation length in lattice units). Here we address the question whether or not this divergence persists after the application of the Gradient Flow.The 2d Heisenberg model --- or 2d O(3) model --- is popular in condensed matter physics, and in particle physics as a toy model for QCD. Along with other analogies, it shares with 4d Yang-Mills theories, and with QCD, the property that the configurations are divided in topological sectors. In the lattice regularisation the topological charge $Q$ can still be defined such that $Q \in \mathbb{Z}$. It has generally been observed, however, that the topological susceptibility $\chi_{\rm t} = \langle Q^2 \rangle / V$ does not scale properly in the continuum limit, i.e. that the quantity $\chi_{\rm t} \xi^2$ diverges for $\xi \to \infty$ (where $\xi$ is the correlation length in lattice units). Here we address the question whether or not this divergence persists after the application of the Gradient Flow.arXiv:1709.06180oai:cds.cern.ch:22891842017-09-18 |
| spellingShingle | hep-ph Particle Physics - Phenomenology cond-mat.stat-mech hep-lat Particle Physics - Lattice Sandoval, Ilya O. Bietenholz, Wolfgang de Forcrand, Philippe Gerber, Urs Mejía-Díaz, Héctor Topology in the 2d Heisenberg Model under Gradient Flow |
| title | Topology in the 2d Heisenberg Model under Gradient Flow |
| title_full | Topology in the 2d Heisenberg Model under Gradient Flow |
| title_fullStr | Topology in the 2d Heisenberg Model under Gradient Flow |
| title_full_unstemmed | Topology in the 2d Heisenberg Model under Gradient Flow |
| title_short | Topology in the 2d Heisenberg Model under Gradient Flow |
| title_sort | topology in the 2d heisenberg model under gradient flow |
| topic | hep-ph Particle Physics - Phenomenology cond-mat.stat-mech hep-lat Particle Physics - Lattice |
| url | https://dx.doi.org/10.1088/1742-6596/912/1/012024 http://cds.cern.ch/record/2289184 |
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