about
The Potts modelPredictions of bond percolation thresholds for the kagomé and Archimedean (3, 12(2)) latticesPercolation transitions in two dimensionsBiased percolation on scale-free networksCritical frontier of the Potts and percolation models on triangular-type and kagome-type lattices. II. Numerical analysisCritical condition of the water-retention modelShort-range correlations in percolation at criticalityNonuniversal critical dynamics in Monte Carlo simulationsNeuron recognition by parallel Potts segmentation.Speed-up of Monte Carlo simulations by sampling of rejected states.Fracturing ranked surfacesUnderstanding the role of hydrogen bonds in water dynamics and protein stability.Upper and lower critical decay exponents of Ising ferromagnets with long-range interaction.Exploring percolative landscapes: Infinite cascades of geometric phase transitions.Microcanonical ensemble simulation method applied to discrete potential fluids.Reversible first-order transition in Pauli percolation.Hearing the shape of the Ising model with a programmable superconducting-flux annealer.Exact sampling from nonattractive distributions using summary states.Bond percolation in higher dimensions.Some geometric critical exponents for percolation and the random-cluster model.Efficient simulation of the random-cluster model.Monte Carlo tests of nucleation concepts in the lattice gas model.Topological transition in dynamic complex networks.Critical Binder cumulant and universality: Fortuin-Kasteleyn clusters and order-parameter fluctuations.Percolation, finite-size scaling, and the thermal scaling power for the Potts model.Universal finite-size-scaling amplitudes of the Potts model on a torus.Geometry, thermodynamics, and finite-size corrections in the critical Potts model.Cluster analysis and finite-size scaling for Ising spin systems.Cluster-size heterogeneity in the two-dimensional Ising model.Computational study of a multistep height model.Finite-size scaling of energylike quantities in percolation.Domain-size heterogeneity in the Ising model: Geometrical and thermal transitions.Exploring cluster Monte Carlo updates with Boltzmann machines.Universal features of cluster numbers in percolation.An Introduction to Network Psychometrics: Relating Ising Network Models to Item Response Theory Models.Classifying Potts critical lines.First- and second-order quantum phase transitions of a q-state Potts model in fractal lattices.Original electric-vertex formulation of the symmetric eight-vertex model on the square lattice is fully nonuniversal.Exact Logarithmic Four-Point Functions in the Critical Two-Dimensional Ising Model.Correspondence between spanning trees and the Ising model on a square lattice.
P2860
Q27345501-B3003EFA-FE3B-44B5-B51A-EDAB1AC901D5Q27349732-9C6E93CB-E991-400B-A3BD-4566E94E15FEQ27350437-3D0F3793-F739-4AB5-87F8-71C4793FA6F0Q27444466-62D47A13-C2C1-4883-9D37-F4CE70989C64Q27444478-F8F73F2D-377B-4045-B810-A3E448FD3922Q27444625-8A1569B3-9D6D-4B63-B803-25B33201B97BQ27445235-16ABAF88-E480-4195-8FA1-62AD974BD104Q27450347-FA685694-D8C0-4A58-A2AA-81906998615BQ30902243-65F038DA-CB50-4EAA-8EBC-BDD6A0D45ADCQ33581967-7C890C0B-C670-499E-B2A5-93EABFC43FC3Q34265457-70A0DA30-BBBB-401B-B341-AC607B5DC4B1Q38070674-17B60E21-D6BA-4C06-9707-CAF1B74350E8Q38375925-0DF77B22-416D-42E3-937A-0CACFF50B1C9Q40002073-679817A8-9DA0-46E7-8FEB-F5F1AB7F96DFQ40433563-FABF6087-57AD-4AE6-A20D-498B2882BF85Q42150326-439A52CE-97BE-48BB-81BF-8E896D483301Q42739886-A31E6EE6-D41D-44E4-B7AC-5EF5A259B832Q43645853-C360FAAA-88D4-4935-96E0-70A2653D8C2CQ44642383-89715F38-E46C-42F4-8E1B-52CD23C4D9CDQ45195139-89AC7A7F-9A2F-44A5-BBAB-0C438125B63CQ45719600-0C5514A9-7878-4C1F-A563-B14994CED9EAQ45911028-5F843CA5-A9DF-464A-9C9F-3B2BD8FA0C09Q45961557-4058314F-416B-4D4D-A360-BC970A1C7533Q46647500-E2C81338-FFD5-4609-90D6-E96FDB1A94A8Q47172166-AC527F68-8E3A-4F2F-84A2-149A70D2B407Q47179115-25C07A30-B35D-43FA-969A-C315D18C5A0CQ47187618-F4C06C47-58C8-4709-A3D0-648F6ECC9FB1Q47187657-CABC394B-3E6D-4290-8609-16F8CCEED821Q47281244-D1998DA7-35F5-4B08-816F-31BEAD32F071Q47283372-1BC13D72-D123-4537-A5E6-931374693A35Q47325774-CA6270A9-6D6E-494C-897F-B2535D6954D7Q47387388-0FD5E1CB-039C-4D96-8042-C4FCAC4BCB4DQ47559423-B4BE1D5B-6267-42F7-882D-DBD2C6FA19E3Q47559479-8DFD4C23-0C70-4564-B5C6-EE52EF2B0CE1Q47716510-2EA9507B-A3EC-44E0-BE27-C2762CF9A7CEQ49958142-A9EBCD29-F7F3-4D5F-BB90-A438215B9E6CQ49960076-683E11FC-42E5-441B-8B0B-65387FB7FDD6Q49966787-A6879372-EC52-4AF0-80DA-41BD44410E7AQ50012448-1C5FFC6F-34F9-4A9E-AB3F-F56989977AF4Q50197005-D66FB373-E744-4675-96E7-74742C55AD58
P2860
description
article
@en
im Februar 1972 veröffentlichter wissenschaftlicher Artikel
@de
wetenschappelijk artikel
@nl
наукова стаття, опублікована в лютому 1972
@uk
ലേഖനം
@ml
name
On the random-cluster model
@en
On the random-cluster model
@nl
type
label
On the random-cluster model
@en
On the random-cluster model
@nl
prefLabel
On the random-cluster model
@en
On the random-cluster model
@nl
P1433
P1476
On the random-cluster model
@en
P2093
C.M. Fortuin
P.W. Kasteleyn
P304
P356
10.1016/0031-8914(72)90045-6
P577
1972-02-01T00:00:00Z