Asymptotically Optimal Vertex Ranking of Planar Graphs

Abstract

A (vertex) -ranking is a colouring :V(G) of the vertices of a graph G with integer colours so that for any path u0,…,up of length at most , (u0)≠(up) or (u0)<\(u0),…,(up)\. We show that, for any fixed integer 2, every n-vertex planar graph has an -ranking using O( n/ n) colours and this is tight even when =2; for infinitely many values of n, there are n-vertex planar graphs, for which any 2-ranking requires ( n/ n) colours. This result also extends to bounded genus graphs. In developing this proof we obtain optimal bounds on the number of colours needed for -ranking graphs of treewidth t and graphs of simple treewidth t. These upper bounds are constructive and give O(n)-time algorithms. Additional results that come from our techniques include new sublogarithmic upper bounds on the number of colours needed for -rankings of apex minor-free graphs and k-planar graphs.