A Note on Powers of Paths in Tournaments
Abstract
In this note we show that every tournament on n vertices contains the k-th power of a directed path of length n/26k+7, which improves upon the recent bound of Scott and Kor\'andi of n/223k. By doing so, we get an inverse exponential dependence on k, which is best possible as Yuster recently showed an upper bound of kn/2k/2.
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