Asymptotically Optimal Threshold Bias for the (a : b) Maker-Breaker Minimum Degree, Connectivity and Hamiltonicity Games

Abstract

We study the (a:b) Maker-Breaker subgraph game played on the edges of the complete graph Kn on n vertices, n,a,b ∈ N where the goal of Maker is to build a copy of a specific fixed subgraph H. In our work this is a spanning graph with minimum degree k=k(n), a connected spanning subgraph or a Hamiltonian subgraph. In the (a:b) game in each round Maker chooses a unclaimed edges of Kn and Breaker chooses b unclaimed edges. Maker wins, if he succeeds to build a copy of the subgraph under consideration, otherwise Breaker wins. For the k-minimum-degree, we present a winning strategy for Maker leading to a bound that generalizes a bound of Gebauer and Szab\'o for the (1:b) case. Moreover, we give an explicit strategy for Breaker for b >(1+o(1)) ana+(n) in case of a=o(n(n)) and k=o((n)). Note that this bound is the same as the Maker bound presented by Hefetz et al. (2012) for the (a:b) connectivity game, which implies that the asymptotic optimal bias for this game is ana+(n). This resolves the open problem stated by these authors. We also study the (a:b) Hamiltonicity game in which Maker's goal is to create a Hamiltonian subgraph. For the (1:b) variant Krivelevich proved that (1+o(1) )n n is the exact threshold bias. Controlling Breaker's vertex degree in the (a:b) Maker-Breaker minimum degree game enables us to the asymptotic optimal generalized threshold bias for the (a:b)-game, both for a=o(n n ) and a=(n n ).