On superuniversality in theq-state Potts model with quenched disorder
From MaRDI portal
Publication:3302929
DOI10.1088/1742-5468/aa9badzbMath1457.82062arXiv1709.00364OpenAlexW3104404844MaRDI QIDQ3302929
Elena Tartaglia, Gesualdo Delfino
Publication date: 11 August 2020
Published in: Journal of Statistical Mechanics: Theory and Experiment (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1709.00364
Related Items (7)
Critical points in the CP N−1 model ⋮ Critical points of coupled vector-Ising systems. Exact results ⋮ Exact results for the O(\(N\)) model with quenched disorder ⋮ Critical points in coupled Potts models and correlated percolation ⋮ On the RPN−1 and CPN−1 universality classes ⋮ Structure of interfaces at phase coexistence. Theory and numerics ⋮ Critical lines in the pure and disordered O(N) model
Cites Work
- Unnamed Item
- Unnamed Item
- Fields, particles and universality in two dimensions
- Potts q-color field theory and scaling random cluster model
- Conformal field theory
- Quantum groups and generalized statistics in integrable models
- Strong-disorder paramagnetic-ferromagnetic fixed point in the square-lattice \(\pm J\) Ising model
- On the space of quantum fields in massive two-dimensional theories
- Absence of phase transition for antiferromagnetic Potts models via the Dobrushin uniqueness theorem
- Critical behaviour of random-bond Potts models: A transfer matrix study
- Coupled Potts models: self-duality and fixed point structure.
- Interface localization near criticality
- Parafermionic excitations and critical exponents of random cluster and \(\mathrm{O}(n)\) models
- Confinement in the \(q\)-state Potts field theory
- Potts-model critical manifolds revisited
- On three-point connectivity in two-dimensional percolation
- Crossing probability and number of crossing clusters in off-critical percolation
- Universal amplitude ratios of two-dimensional percolation from field theory
- Critical Behavior of Random-Bond Potts Models
- INTEGRABLE FIELD THEORY OF THE q-STATE POTTS MODEL WITH 0<q<4
- High-precision phase diagram of spin glasses from duality analysis with real-space renormalization and graph polynomials
- High-precision percolation thresholds and Potts-model critical manifolds from graph polynomials
- Connectivities of Potts Fortuin-Kasteleyn clusters and time-like Liouville correlator
This page was built for publication: On superuniversality in theq-state Potts model with quenched disorder
