Maker-Breaker domination game on trees when Staller wins

Abstract

In the Maker-Breaker domination game played on a graph G, Dominator's goal is to select a dominating set and Staller's goal is to claim a closed neighborhood of some vertex. We study the cases when Staller can win the game. If Dominator (resp., Staller) starts the game, then γ SMB(G) (resp., γ SMB'(G)) denotes the minimum number of moves Staller needs to win. For every positive integer k, trees T with γ SMB'(T)=k are characterized and a general upper bound on γ SMB' is proved. Let S = S(n1,…, n) be the subdivided star obtained from the star with edges by subdividing its edges n1-1, …, n-1 times, respectively. Then γ SMB'(S) is determined in all the cases except when 4 and each ni is even. The simplest formula is obtained when there are at least two odd nis. If n1 and n2 are the two smallest such numbers, then γ SMB'(S(n1,…, n))= 2(n1+n2+1). For caterpillars, exact formulas for γ SMB and for γ SMB' are established.

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