Maximising H-Colourings of Graphs

Abstract

For graphs G and H, an H-colouring of G is a map :V(G)→ V(H) such that ij∈ E(G)⇒(i)(j)∈ E(H). The number of H-colourings of G is denoted by (G,H). We prove the following: for all graphs H and δ≥3, there is a constant (δ,H) such that, if n≥(δ,H), the graph Kδ,n-δ maximises the number of H-colourings among all connected graphs with n vertices and minimum degree δ. This answers a question of Engbers. We also disprove a conjecture of Engbers on the graph G that maximises the number of H-colourings when the assumption of the connectivity of G is dropped. Finally, let H be a graph with maximum degree k. We show that, if H does not contain the complete looped graph on k vertices or Kk,k as a component and δ≥δ0(H), then the following holds: for n sufficiently large, the graph Kδ,n-δ maximises the number of H-colourings among all graphs on n vertices with minimum degree δ. This partially answers another question of Engbers.