Critical points in coupled Potts models and correlated percolation
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Publication:5060453
DOI10.1088/1742-5468/aca901OpenAlexW4313525944MaRDI QIDQ5060453
Noel Lamsen, Youness Diouane, Gesualdo Delfino
Publication date: 10 January 2023
Published in: Journal of Statistical Mechanics: Theory and Experiment (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2208.14844
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- Universal properties of Ising clusters and droplets near criticality
- Potts q-color field theory and scaling random cluster model
- Conformal field theory
- The antiferromagnetic transition for the square-lattice Potts model
- Field theory of Ising percolating clusters
- Universal amplitude ratios in the two-dimensional \(q\)-state Potts model and percolation from quantum field theory
- Critical RSOS models in external fields
- Coupled Potts models: self-duality and fixed point structure.
- Universality of coupled Potts models
- Exact results for the O(\(N\)) model with quenched disorder
- Parafermionic excitations and critical exponents of random cluster and \(\mathrm{O}(n)\) models
- Confinement in the \(q\)-state Potts field theory
- Sine-Gordon description of the scaling three-state Potts antiferromagnet on the square lattice
- Critical properties of joint spin and Fortuin–Kasteleyn observables in the two-dimensional Potts model
- THE ANTIFERROMAGNETIC POTTS MODEL
- Critical exponents of domain walls in the two-dimensional Potts model
- On three-point connectivity in two-dimensional percolation
- Factorization of correlations in two-dimensional percolation on the plane and torus
- Crossing probability and number of crossing clusters in off-critical percolation
- Spin clusters and conformal field theory
- Non compact continuum limit of two coupled Potts models
- On superuniversality in theq-state Potts model with quenched disorder
- Critical points in coupled Potts models and critical phases in coupled loop models
- Universal amplitude ratios of two-dimensional percolation from field theory
- SOLUTIONS OF THE STAR-TRIANGLE EQUATIONS IN (Nα,Nβ) POTTS MODELS
- A constrained Potts antiferromagnet model with an interface representation
- INTEGRABLE FIELD THEORY OF THE q-STATE POTTS MODEL WITH 0<q<4
- The three-state Potts antiferromagnet on plane quadrangulations
- Applications of Temperley - Lieb algebras to Lorentz lattice gases
- Critical points in the RP N−1 model
- Critical lines in the pure and disordered O(N) model
- Critical points in the CP N−1 model
- Critical points of coupled vector-Ising systems. Exact results
- On the CFT describing the spin clusters in 2d Potts model
- Absence of nematic quasi-long-range order in two-dimensional liquid crystals with three director components
- Unusual corrections to scaling in the 3-state Potts antiferromagnet on a square lattice.
- Connectivities of Potts Fortuin-Kasteleyn clusters and time-like Liouville correlator
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