Fixation for Two-Dimensional $\mathcal U$-ISING and $\mathcal U$-VOTER Dynamics
Probability
2021-02-24 v1 Mathematical Physics
math.MP
Abstract
Given a finite family of finite subsets of , the - in the space of configurations is defined as follows: every has an independent exponential random clock, and when the clock at rings, the vertex chooses uniformly at random. If the set is entirely in state (resp. ), then the state of updates to (resp. ), otherwise nothing happens. The for this model is the infimum over such that this system almost surely fixates at when the initial states for the vertices are chosen independently to be with probability and to be with probability . We prove that for a wide class of families . We moreover consider the -Ising dynamics and show that this model also exhibits the same phase transition.
Keywords
Cite
@article{arxiv.2003.02420,
title = {Fixation for Two-Dimensional $\mathcal U$-ISING and $\mathcal U$-VOTER Dynamics},
author = {Daniel Blanquicett},
journal= {arXiv preprint arXiv:2003.02420},
year = {2021}
}
Comments
22 pages, 4 figures