Hoffman-London graphs: When paths minimize H-colorings among trees

Abstract

Given a graph G and a target graph H, an H-coloring of G is an adjacency-preserving vertex map from G to H. The number of H-colorings of G, (G,H), has been studied for many classes of G and H. In particular, extremal questions of maximizing and minimizing (G,H) have been considered when H is a clique or G is a tree. In this paper, we develop a new technique using automorphisms of H to show that (T,H) is minimized by paths as T varies over trees on a fixed number of vertices. We introduce the term Hoffman-London to refer to graphs that are minimal in this sense. In particular, we define an automorphic similarity matrix which is used to compute (T,H) and give matrix conditions under which H is Hoffman-London. We then apply this technique to identify several families of graphs that are Hoffman-London, including loop threshold graphs and some with applications in statistical physics (e.g. the Widom-Rowlinson model). By combining our approach with a few other observations, we fully characterize the minimizing trees for all graphs H on three or fewer vertices.

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