H-colouring bipartite graphs
Abstract
For graphs and , an {\em -colouring} of (or {\em homomorphism} from to ) is a function from the vertices of to the vertices of that preserves adjacency. -colourings generalize such graph theory notions as proper colourings and independent sets. For a given , and we consider the proportion of vertices of that get mapped to in a uniformly chosen -colouring of . Our main result concerns this quantity when is regular and bipartite. We find numbers with the property that for all such , with high probability the proportion is between and , and we give examples where these extremes are achieved. For many we have for all and so in these cases we obtain a quite precise description of the almost sure appearance of a randomly chosen -colouring. As a corollary, we show that in a uniform proper -colouring of a regular bipartite graph, if is even then with high probability every colour appears on a proportion close to of the vertices, while if is odd then with high probability every colour appears on at least a proportion close to of the vertices and at most a proportion close to of the vertices. Our results generalize to natural models of weighted -colourings, and also to bipartite graphs which are sufficiently close to regular. As an application of this latter extension we describe the typical structure of -colourings of graphs which are obtained from -regular bipartite graphs by percolation, and we show that is a threshold function across which the typical structure changes. The approach is through entropy, and extends work of J. Kahn, who considered the size of a randomly chosen independent set of a regular bipartite graph.
Cite
@article{arxiv.1101.0839,
title = {H-colouring bipartite graphs},
author = {John Engbers and David Galvin},
journal= {arXiv preprint arXiv:1101.0839},
year = {2012}
}
Comments
27 pages, small revisions from previous version, this version appears in Journal of Combinatorial Theory Series B