Non-invertible symmetries and RG flows in the two-dimensional \(O(n)\) loop model
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Publication:6120061
DOI10.1007/jhep12(2023)090arXiv2305.05746MaRDI QIDQ6120061
Hubert Saleur, Jesper Lykke Jacobsen
Publication date: 20 February 2024
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2305.05746
Cites Work
- Fields, particles and universality in two dimensions
- Topological defect lines and renormalization group flows in two dimensions
- Deligne categories in lattice models and quantum field theory, \textit{or} making sense of O(N) symmetry with non-integer N
- Duality and defects in rational conformal field theory
- Field theory of compact polymers on the square lattice
- Anyonic chains, topological defects, and conformal field theory
- Casimir elements from the Brauer-Schur-Weyl duality
- Two-dimensional \(O(n)\) models and logarithmic CFTs
- \(U_{\mathfrak{q}}\mathfrak{sl}_2 \)-invariant non-compact boundary conditions for the XXZ spin chain
- Topological defects on the lattice: I. The Ising model
- Dense Loops, Supersymmetry, and Goldstone Phases in Two Dimensions
- On the growth constant for square-lattice self-avoiding walks
- Critical points of Potts and O(N) models from eigenvalue identities in periodic Temperley–Lieb algebras
- Equivalence of the Potts model or Whitney polynomial with an ice-type model
- Operator spectrum and exact exponents of the fully packed loop model
- Self-avoiding polygons on the square lattice
- Spontaneous symmetry breaking in 2D supersphere sigma models and applications to intersecting loop soups
- High-precision percolation thresholds and Potts-model critical manifolds from graph polynomials
- Generalised twisted partition functions
- Topological defects in lattice models and affine Temperley-Lieb algebra
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