Asymptotics in High Dimensions For the Fortuin-Kasteleyn Random Cluster Model
- 1 January 1991
- book chapter
- Published by Springer Nature
Abstract
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This publication has 14 references indexed in Scilit:
- Mean-field critical behaviour for percolation in high dimensionsCommunications in Mathematical Physics, 1990
- A note on the Ising model in high dimensionsCommunications in Mathematical Physics, 1989
- Density and uniqueness in percolationCommunications in Mathematical Physics, 1989
- On the uniqueness of the infinite cluster in the percolation modelCommunications in Mathematical Physics, 1988
- Generalization of the Fortuin-Kasteleyn-Swendsen-Wang representation and Monte Carlo algorithmPhysical Review D, 1988
- Discontinuity of the magnetization in one-dimensional 1/ x?y 2 Ising and Potts modelsJournal of Statistical Physics, 1988
- Uniqueness of the infinite cluster and continuity of connectivity functions for short and long range percolationCommunications in Mathematical Physics, 1987
- On the random-cluster modelPhysica, 1972
- Critical Temperatures of Anisotropic Ising Lattices. II. General Upper BoundsPhysical Review B, 1967
- A lower bound for the critical probability in a certain percolation processMathematical Proceedings of the Cambridge Philosophical Society, 1960