AbstractFor a positive integer k, we consider the k-vertex-connectivity game, played on the edge set of Kn, the complete graph on n vertices. We first study the Maker–Breaker version of this game and prove that, for any integer k≥2 and sufficiently large n, Maker has a strategy to win this game within ⌊kn/2⌋+1 moves, which is easily seen to be best possible. This answers a question from Hefetz et al. (2009) [6]. We then consider the strong k-vertex-connectivity game. For every positive integer k and sufficiently large n, we describe an explicit first player’s winning strategy for this game
We investigate a two player game called the $K^4$-building game: two players alternately claim edges...
We study the biased $(2:b)$ Walker--Breaker games, played on the edge set ofthe complete graph on $n...
Two players claim alternately edges of the complete graph on n vertices. The winner is the one who m...
AbstractFor a positive integer k, we consider the k-vertex-connectivity game, played on the edge set...
AbstractWe study Maker/Breaker games on the edges of the complete graph, as introduced by Chvátal an...
In this paper we study the (a : b) Maker-Breaker Connectivity game, played on the edge set of the co...
We initiate the study of the algorithmic complexity of Maker-Breaker games played on edge sets of gr...
AbstractWe consider unbiased Maker–Breaker games played on the edge set of the complete graph Kn on ...
AbstractIn this paper we consider Maker–Breaker games, played on the edges of sparse graphs. For a g...
We study the Maker-Breaker k-clique game played on the edge set of the random graph G(n, p). In this...
In a Maker-Breaker game on a graph G, Breaker and Maker alternately claim edges of G. Maker wins if,...
For a tree T on n vertices, we study the Maker-Breaker game, played on the edge set of the complete ...
We study the biased $(1:b)$ Maker--Breaker positional games, played on theedge set of the complete g...
International audienceGiven a graph G and k ∈ N, we introduce the following game played in G. Each r...
In a Maker-Breaker game on a graph G, Breaker and Maker alternately claim edges of G. Maker wins if,...
We investigate a two player game called the $K^4$-building game: two players alternately claim edges...
We study the biased $(2:b)$ Walker--Breaker games, played on the edge set ofthe complete graph on $n...
Two players claim alternately edges of the complete graph on n vertices. The winner is the one who m...
AbstractFor a positive integer k, we consider the k-vertex-connectivity game, played on the edge set...
AbstractWe study Maker/Breaker games on the edges of the complete graph, as introduced by Chvátal an...
In this paper we study the (a : b) Maker-Breaker Connectivity game, played on the edge set of the co...
We initiate the study of the algorithmic complexity of Maker-Breaker games played on edge sets of gr...
AbstractWe consider unbiased Maker–Breaker games played on the edge set of the complete graph Kn on ...
AbstractIn this paper we consider Maker–Breaker games, played on the edges of sparse graphs. For a g...
We study the Maker-Breaker k-clique game played on the edge set of the random graph G(n, p). In this...
In a Maker-Breaker game on a graph G, Breaker and Maker alternately claim edges of G. Maker wins if,...
For a tree T on n vertices, we study the Maker-Breaker game, played on the edge set of the complete ...
We study the biased $(1:b)$ Maker--Breaker positional games, played on theedge set of the complete g...
International audienceGiven a graph G and k ∈ N, we introduce the following game played in G. Each r...
In a Maker-Breaker game on a graph G, Breaker and Maker alternately claim edges of G. Maker wins if,...
We investigate a two player game called the $K^4$-building game: two players alternately claim edges...
We study the biased $(2:b)$ Walker--Breaker games, played on the edge set ofthe complete graph on $n...
Two players claim alternately edges of the complete graph on n vertices. The winner is the one who m...