H-coloring tori

Abstract

For graphs G and H, an H-coloring of G is a function from the vertices of G to the vertices of H that preserves adjacency. H-colorings encode graph theory notions such as independent sets and proper colorings, and are a natural setting for the study of hard-constraint models in statistical physics. We study the set of H-colorings of the even discrete torus Zdm, the graph on vertex set 0, ..., m-1d (m even) with two strings adjacent if they differ by 1 (mod m) on one coordinate and agree on all others. This is a bipartite graph, with bipartition classes E and O. In the case m=2 the even discrete torus is the discrete hypercube or Hamming cube Qd, the usual nearest neighbor graph on 0,1d. We obtain, for any H and fixed m, a structural characterization of the space of H-colorings of Zdm. We show that it may be partitioned into an exceptional subset of negligible size (as d grows) and a collection of subsets indexed by certain pairs (A,B) ∈ V(H)2, with each H-coloring in the subset indexed by (A,B) having all but a vanishing proportion of vertices from E mapped to vertices from A, and all but a vanishing proportion of vertices from O mapped to vertices from B. This implies a long-range correlation phenomenon for uniformly chosen H-colorings of Zdm with m fixed and d growing. Our proof proceeds through an analysis of the entropy of a uniformly chosen H-coloring, and extends an approach of Kahn, who had considered the special case of m=2 and H a doubly infinite path. All our results generalize to a natural weighted model of H-colorings.