The topological susceptibility in the large-\(N\) limit of \(\mathrm{SU}(N)\) Yang-Mills theory
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Publication:1636116
DOI10.1016/j.physletb.2016.09.029zbMath1390.81391arXiv1607.05939OpenAlexW2492048207MaRDI QIDQ1636116
Stefan Schaefer, Marco Cè, Leonardo Giusti, Miguel García Vera
Publication date: 4 June 2018
Published in: Physics Letters. B (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1607.05939
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Related Items (4)
The large-\(N\) limit of the chiral condensate from twisted reduced models ⋮ Topological properties of \(\mathbb{CP}^{N-1} \) models in the large-\(N\) limit ⋮ Large-\(N\) \(\mathrm{SU}(N)\) Yang-Mills theories with milder topological freezing ⋮ Color dependence of the topological susceptibility in Yang-Mills theories
Cites Work
- Lattice QCD without topology barriers
- Critical slowing down and error analysis in lattice QCD simulations
- Infinite \(N\) phase transitions in continuum Wilson loop operators
- \(\theta \) dependence of \(SU(N)\) gauge theories
- Monte Carlo errors with less errors
- Topology of \(\text{SU}(N)\) gauge theories at \(T \simeq 0\) and \(T \simeq T_{c}\)
- Instantons and chiral symmetry breaking in SU(N) gauge theories
- The \(k=2\) string tension in four-dimensional SU(N) gauge theories
- Properties and uses of the Wilson flow in lattice QCD
- Universality of the topological susceptibility in the SU(3) gauge theory
- The \(U_A(1)\) problem on the lattice with Ginsparg-Wilson fermions
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