The minimum degree question for the Maker Breaker Domination Game

Abstract

The Maker Breaker Domination Game is a two player game played on a graph G in which the players take turns to claim a vertex from the graph. The aim of the Dominator is to claim the vertices of a dominating set, and the aim of the Staller is to prevent this. In this paper, we consider the following problem: for a given integer d, what is the size of the smallest (with respect to the number of vertices) graph with minimum degree d such that the Dominator loses going first? We write β(d) to denote the answer to this question. We determine the precise value of β(d) for d≤ 3. For general d it was known that 2d+1 ≤ β(d) ≤ 2d+1+2d; the upper bound is due to a construction communicated to us by Valentin Gledel, while the lower bound follows from a simple application of the Erdős-Selfridge Theorem. We improve the lower bound to β(d) ≥ 2d+1+2.