Thresholds for the biased Maker-Breaker domination games

Abstract

In the (a,b)-biased Maker-Breaker domination game, two players alternately select unplayed vertices in a graph G such that Dominator selects a and Staller selects b vertices per move. Dominator wins if the vertices he selected during the game form a dominating set of G, while Staller wins if she can prevent Dominator from achieving this goal. Given a positive integer b, Dominator's threshold, ab, is the minimum a such that Dominator wins the (a,b)-biased game on G when he starts the game. Similarly, a'b denotes the minimum a such that Dominator wins when Staller starts the (a,b)-biased game. Staller's thresholds, ba and b'a, are defined analogously. It is proved that Staller wins the (k-1,k)-biased games in a graph G if its order is sufficiently large with respect to a function of k and the maximum degree of G. Along the way, the -local domination number of a graph is introduced. This new parameter is proved to bound Dominator's thresholds a and a' from above. As a consequence, a1'(G) 2 holds for every claw-free graph G. More specific results are obtained for thresholds in line graphs and Cartesian grids. Based on the concept of [1,k]-factor of a graph G, we introduce the star partition width σ(G) of G, and prove that a1'(G) σ(G) holds for any nontrivial graph G, while a1'(G)=σ(G) if G is a tree.

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