Maximizing H-colorings of a regular graph

Abstract

For graphs G and H, a homomorphism from G to H, or H-coloring of G, is an adjacency preserving map from the vertex set of G to the vertex set of H. Writing hom(G,H) for the number of H-colorings admitted by G, we conjecture that for any simple finite graph H (perhaps with loops) and any simple finite n-vertex, d-regular, loopless graph G we have hom(G,H) ≤ hom(Kd,d,H)n2d, hom(Kd+1,H)nd+1 where Kd,d is the complete bipartite graph with d vertices in each partition class, and Kd+1 is the complete graph on d+1 vertices. Results of Zhao confirm this conjecture for some choices of H for which the maximum is achieved by hom(Kd,d,H)n/2d. Here we exhibit infinitely many non-trivial triples (n,d,H) for which the conjecture is true and for which the maximum is achieved by hom(Kd+1,H)n/(d+1). We also give sharp estimates for hom(Kd,d,H) and hom(Kd+1,H) in terms of some structural parameters of H. This allows us to characterize those H for which hom(Kd,d,H)1/2d is eventually (for all sufficiently large d) larger than hom(Kd+1,H)1/(d+1) and those for which it is eventually smaller, and to show that this dichotomy covers all non-trivial H. Our estimates also allow us to obtain asymptotic evidence for the conjecture in the following form. For fixed H, for all d-regular G we have hom(G,H)1|V(G)| ≤ (1+o(1)) hom(Kd,d,H)12d, hom(Kd+1,H)1d+1 where o(1)→ 0 as d → ∞. More precise results are obtained in some special cases.