Finitary Coloring
Abstract
Suppose that the vertices of are assigned random colors via a finitary factor of independent identically distributed (iid) vertex-labels. That is, the color of vertex is determined by a rule that examines the labels within a finite (but random and perhaps unbounded) distance of , and the same rule applies at all vertices. We investigate the tail behavior of if the coloring is required to be proper (that is, if adjacent vertices must receive different colors). When , the optimal tail is given by a power law for 3 colors, and a tower (iterated exponential) function for 4 or more colors (and also for 3 or more colors when ). If proper coloring is replaced with any shift of finite type in dimension 1, then, apart from trivial cases, tower function behavior also applies.
Cite
@article{arxiv.1412.2725,
title = {Finitary Coloring},
author = {Alexander E. Holroyd and Oded Schramm and David B. Wilson},
journal= {arXiv preprint arXiv:1412.2725},
year = {2016}
}
Comments
35 pages, 3 figures