Monte-Carlo simulation of Ising droplets in correlated site-bond percolation
- 1 January 1981
- journal article
- Published by EDP Sciences in Journal de Physique Lettres
- Vol. 42 (5) , 99-102
- https://doi.org/10.1051/jphyslet:0198100420509900
Abstract
The definition of droplets in the Ising model by Coniglio and Klein is investigated numerically on square and simple cubic lattices. Our data are consistent with their prediction that the droplets diverge at T c : for 16 × 16 × 17 lattices, the divergence occurs at T/ Tc = 1.02. Above Tc in three dimensions and zero magnetic field, as a function of the concentration of active bonds, we find about the same critical exponent v = 0.9 as for random percolation; but the percolation threshold is twice as largeKeywords
This publication has 8 references indexed in Scilit:
- Clusters and Ising critical droplets: a renormalisation group approachJournal of Physics A: General Physics, 1980
- Influence of boundary conditions on square bond percolation nearp cZeitschrift für Physik B Condensed Matter, 1980
- Scaling theory of percolation clustersPhysics Reports, 1979
- Site-Bond Correlated-Percolation Problem: A Statistical Mechanical Model of Polymer GelationPhysical Review Letters, 1979
- Percolation points and critical point in the Ising modelJournal of Physics A: General Physics, 1977
- “Clusters” in the Ising model, metastable states and essential singularityAnnals of Physics, 1976
- Finite-size behavior of the Ising square latticePhysical Review B, 1976
- Evidence for Fisher's Droplet Model in Simulated Two-Dimensional Cluster DistributionsPhysical Review B, 1972