Colouring exact distance graphs of chordal graphs

Abstract

For a graph G=(V,E) and positive integer p, the exact distance-p graph G[ p] is the graph with vertex set V and with an edge between vertices x and y if and only if x and y have distance p. Recently, there has been an effort to obtain bounds on the chromatic number (G[ p]) of exact distance-p graphs for G from certain classes of graphs. In particular, if a graph G has tree-width t, it has been shown that (G[ p]) ∈ O(pt-1) for odd p, and (G[ p]) ∈ O(pt(G)) for even p. We show that if G is chordal and has tree-width t, then (G[ p]) ∈ O(p\, t2) for odd p, and (G[ p]) ∈ O(p\, t2 (G)) for even p. If we could show that for every graph H of tree-width t there is a chordal graph G of tree-width t which contains H as an isometric subgraph (i.e., a distance preserving subgraph), then our results would extend to all graphs of tree-width t. While we cannot do this, we show that for every graph H of genus g there is a graph G which is a triangulation of genus g and contains H as an isometric subgraph.