The domination game played on diameter 2 graphs

Abstract

Let γg(G) be the game domination number of a graph G. It is proved that if diam(G) = 2, then γg(G) n(G)2 - n(G)11. The bound is attained: if diam(G) = 2 and n(G) 10, then γg(G) = n(G)2 if and only if G is one of seven sporadic graphs with n(G) 6 or the Petersen graph, and there are exactly ten graphs of diameter 2 and order 11 that attain the bound.