A non-trivial upper bound on the threshold bias of the Oriented-cycle game

Abstract

In the Oriented-cycle game, introduced by Bollob\'as and Szab\'o, two players, called OMaker and OBreaker, alternately direct edges of Kn. OMaker directs exactly one edge, whereas OBreaker is allowed to direct between one and b edges. OMaker wins if the final tournament contains a directed cycle, otherwise OBreaker wins. Bollob\'as and Szab\'o conjectured that for a bias as large as n-3 OMaker has a winning strategy if OBreaker must take exactly b edges in each round. It was shown recently by Ben-Eliezer, Krivelevich and Sudakov, that OMaker has a winning strategy for this game whenever b≤ n2-2. In this paper, we show that OBreaker has a winning strategy whenever b≥ 5n6+2. Moreover, in case OBreaker is required to direct exactly b edges in each move, we show that OBreaker wins for b≥ 19n20, provided that n is large enough. This refutes the conjecture by Bollob\'as and Szab\'o.