The Eternal Game Chromatic Number of Random Graphs

Abstract

The eternal graph colouring problem, recently introduced by Klostermeyer and Mendoza, is a version of the graph colouring game, where two players take turns properly colouring a graph. In this note, we study the eternal game chromatic number of random graphs. We show that with high probability g∞(Gn,p) = (p2 + o(1))n for odd n, and also for even n when p=1k for some k ∈ N. The upper bound applies for even n and any other value of p as well, but we conjecture in this case this upper bound is not sharp. Finally, we answer a question posed by Klostermeyer and Mendoza.