Maker-Breaker total domination number

Abstract

The Maker-Breaker total domination number, γ MBT(G), of a graph G is introduced as the minimum number of moves of Dominator to win the Maker-Breaker total domination game, provided that he has a winning strategy and is the first to play. The Staller-start Maker-Breaker total domination number, γ MBT'(G), is defined analogously for the game in which Staller starts. Upper and lower bounds on γ MBT(G) and on γ MBT'(G) are provided and demonstrated to be sharp. It is proved that for any pair of integers (k,) with 2≤ k≤ , (i) there exists a connected graph G with γ MB(G)=k and γ MBT(G)=, (ii) there exists a connected graph G' with γ MB'(G')=k and γ MBT'(G')=, and (iii) there there exists a connected graph G'' with γ MBT(G'')=k and γ MBT'(G'')=. Here, γ MB and γ MB' are corresponding invariants for the Maker-Breaker domination game.