Fast winning strategies for Staller in the Maker-Breaker domination game

Abstract

The Maker-Breaker domination game is played on a graph G by two players, called Dominator and Staller, who alternately choose a vertex that has not been played so far. Dominator wins the game if his moves form a dominating set. Staller wins if she plays all vertices from a closed neighborhood of a vertex v ∈ V(G). Dominator's fast winning strategies were studied earlier. In this work, we concentrate on the cases when Staller has a winning strategy in the game. We introduce the invariant γ' SMB(G) (resp., γ SMB(G)) which is the smallest integer k such that, under any strategy of Dominator, Staller can win the game by playing at most k vertices, if Staller (resp., Dominator) plays first on the graph G. We prove some basic properties of γ SMB(G) and γ' SMB(G) and study the parameters' changes under some operators as taking the disjoint union of graphs or deleting a cut vertex. We show that the inequality δ(G)+1 γ' SMB(G) γ SMB(G) always holds and that for every three integers r,s,t with 2 r s t, there exists a graph G such that δ(G)+1 = r, γ' SMB(G) = s, and γ SMB(G) = t. We prove exact formulas for γ' SMB(G) where G is a path, or it is a tadpole graph which is obtained from the disjoint union of a cycle and a path by adding one edge between them.