Statistical Mechanics of Probabilistic Cellular Automata
- 2 December 1985
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 55 (23), 2527-2530
- https://doi.org/10.1103/physrevlett.55.2527
Abstract
The necessary and sufficient conditions under which fully probabilistic cellular-automata (PCA) rules possess an underlying Hamiltonian (i.e., are "reversible") are established. It is argued that, even for irreversible rules, continuous ferromagnetic transitions in PCA with "up-down" symmetry belong in the universality class of kinetic Ising models. The nonstationary (e.g., periodic) states achieved for asymptotically large times by certain PCA rules in the (mean field) limit of infinite dimension are argued to persist in two and three dimensions, where fluctuations are strong.Keywords
This publication has 16 references indexed in Scilit:
- Equivalence of Cellular Automata to Ising Models and Directed PercolationPhysical Review Letters, 1984
- Exact Results for Two- and Three-Dimensional Ising and Potts ModelsPhysical Review Letters, 1984
- Digital dynamics and the simulation of magnetic systemsPhysical Review B, 1983
- Dynamic behavior of nonlinear networksPhysical Review A, 1983
- Statistical mechanics of cellular automataReviews of Modern Physics, 1983
- Statistical mechanics of a dynamical system based on Conway's game of LifeJournal of Statistical Physics, 1978
- Theory of dynamic critical phenomenaReviews of Modern Physics, 1977
- Time-Dependent Statistics of the Ising ModelJournal of Mathematical Physics, 1963
- Statistical Mechanical Theory of Ferromagnetism. High Density BehaviorPhysical Review B, 1960
- On the Theory of the Brownian MotionPhysical Review B, 1930