A note on the connected game coloring number

Abstract

We consider the connected game coloring number of a graph, introduced by Charpentier et al. as a game theoretic graph parameter that measures the degeneracy of a graph with respect to a certain two-player game played with an uncooperative adversary. We consider the connected game coloring number of graphs of bounded treedepth and of k-trees. In particular, we show that there exists an outerplanar 2-tree with connected game coloring number of 5, which answers a question from [C. Charpentier, H. Hocquard, E. Sopena, and X. Zhu. A connected version of the graph coloring game. Discrete Appl. Math., 2020].