Strong Ramsey Games: Drawing on an infinite board

Abstract

We consider the strong Ramsey-type game R(k)(H, 0), played on the edge set of the infinite complete k-uniform hypergraph KkN. Two players, called FP (the first player) and SP (the second player), take turns claiming edges of KkN with the goal of building a copy of some finite predetermined k-uniform hypergraph H. The first player to build a copy of H wins. If no player has a strategy to ensure his win in finitely many moves, then the game is declared a draw. In this paper, we construct a 5-uniform hypergraph H such that R(5)(H, 0) is a draw. This is in stark contrast to the corresponding finite game R(5)(H, n), played on the edge set of K5n. Indeed, using a classical game-theoretic argument known as strategy stealing and a Ramsey-type argument, one can show that for every k-uniform hypergraph G, there exists an integer n0 such that FP has a winning strategy for R(k)(G, n) for every n ≥ n0.