Backbone colouring of chordal graphs

Abstract

A proper k-colouring of a graph G=(V,E) is a function c: V(G) \1,…,k\ such that c(u)≠ c(v) for every edge uv∈ E(G). The chromatic number (G) is the minimum k such that there exists a proper k-colouring of G. Given a spanning subgraph H of G, a q-backbone k-colouring of (G,H) is a proper k-colouring c of G such that c(u)-c(v) q for every edge uv∈ E(H). The q-backbone chromatic number BBCq(G,H) is the smallest k for which there exists a q-backbone k-colouring of (G,H). In their seminal paper, Broersma et al.~BFGW07 ask whether, for any chordal graph G and any spanning forest H of G, we have that BBC2(G,H)≤ (G)+O(1). In this work, we first show that this is true as long as H is bipartite and G is an interval graph in which each vertex belongs to at most two maximal cliques. We then show that this does not extend to bipartite graphs as backbone by exhibiting a family of chordal graphs G with spanning bipartite subgraphs H satisfying BBC2(G,H)≥ 5(G)3. Then, we show that if G is chordal and H has bounded maximum average degree (in particular, if H is a forest), then BBC2(G,H)≤ (G)+O((G)). We finally show that BBC2(G,H)≤ 32(G)+O(1) holds whenever G is chordal and H is C4-free.