English

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 U\mathcal U of finite subsets of Zd{0}\mathbb Z^d\setminus \{0\}, the U\mathcal U-voter dynamicsvoter\ dynamics in the space of configurations {+,}Zd\{+,-\}^{\mathbb Z^d} is defined as follows: every vZdv\in\mathbb Z^d has an independent exponential random clock, and when the clock at vv rings, the vertex vv chooses XUX\in\mathcal U uniformly at random. If the set v+Xv+X is entirely in state ++ (resp. -), then the state of vv updates to ++ (resp. -), otherwise nothing happens. The critical probabilitycritical\ probability pcvot(Zd,U)p_c^{\text{vot}}(\mathbb Z^d,\mathcal U) for this model is the infimum over pp such that this system almost surely fixates at ++ when the initial states for the vertices are chosen independently to be ++ with probability pp and to be - with probability 1p1-p. We prove that pcvot(Zd,U)<1p_c^{\text{vot}}(\mathbb Z^d,\mathcal U)<1 for a wide class of families U\mathcal U. We moreover consider the U\mathcal U-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

R2 v1 2026-06-23T14:04:31.891Z