Fast winning strategies in a generalized van der Waerden game

Abstract

Consider the following Maker-Breaker game. Fix a finite subset S⊂N of the naturals. The players Maker and Breaker take turns choosing previously unclaimed natural numbers. Maker wins by eventually building a homothetic copy aS+b of S, where a∈N\0\ and b∈Z. This is a generalization of the van der Waerden game analyzed by Beck. By the Hales-Jewett theorem, there exists a constant c depending only on |S| such that Maker can win in c or less moves. We show that Maker can win in |S| moves if |S|≤ 3. When |S|=4, we show that Maker can always win in 5 or less moves and describe all S such that Maker can win in 4 moves. If |S|≥ 5, Maker has no winning strategy in |S| moves.