Cluster analysis of an Ising–Preisach interacting particle system

Interacting Particle Systems – featuring Ising Models

Interacting Stochastic Systems

Statistical mechanics is the branch of physics that seeks to explain the properties of matter that emerge from microscopic scale interactions. Mathematicians are attempting to acquire a rigorous understanding of the models and calculations arising from physicists’ work. The field of interacting particle systems has proved a fruitful area for mathematical research. Two of the most fundamental mo...

When is an Interacting Particle System Ergodic?

We consider stochastic flip dynamics for an infinite number of Ising spins on the lattice Έ. We find a sequence of constructive criteria for the system to be exponentially ergodic. The main idea is to approximate the continuous time process with discrete time processes (its Euler polygon) and to use an improved version of previous results [MS] about constructive ergodicity of discrete time proc...

Dynamical Stability of Percolation for Some Interacting Particle Systems and Ε - Movability

In this paper we will investigate dynamic stability of percolation for the stochastic Ising model and the contact process. We also introduce the notion of downward and upward ε-movability which will be a key tool for our analysis. 1. Introduction. Consider bond percolation on an infinite connected locally finite graph G, where, for some p ∈ [0, 1], each edge (bond) of G is, independently of all...

AN INTRODUCTION TO INFINITE PARTICLE ( jlYSTEMS *

In ‘i970, Spitzer wrote a paper called “Interaction of Markov processes” in which he introduced several classes of interacting particle systems. These processes and other related models, collectively referred to as infinite particle systems, have been the object of much research in the last ten years. In this paper we will survey some of the results which have been obtained and son?.= of the op...