Fast strategies in Maker-Breaker games played on random boards
Abstract
In this paper we analyze classical Maker-Breaker games played on the edge set of a sparse random board G . We consider the Hamiltonicity game, the perfect matching game and the k-connectivity game. We prove that for p(n)≥ polylog(n)/n, the board G is typically such that Maker can win these games asymptotically as fast as possible, i.e. within n+o(n), n/2+o(n) and kn/2+o(n) moves respectively.
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