On the game chromatic number of sparse random graphs

Abstract

Given a graph G and an integer k, two players take turns coloring the vertices of G one by one using k colors so that neighboring vertices get different colors. The first player wins iff at the end of the game all the vertices of G are colored. The game chromatic number g(G) is the minimum k for which the first player has a winning strategy. The paper BFS began the analysis of the asymptotic behavior of this parameter for a random graph Gn,p. This paper provides some further analysis for graphs with constant average degree i.e. np=O(1) and for random regular graphs.