On the Density of Transitive Tournaments
Abstract
We prove that for every fixed k, the number of occurrences of the transitive tournament Trk of order k in a tournament Tn on n vertices is asymptotically minimized when Tn is random. In the opposite direction, we show that any sequence of tournaments \Tn\ achieving this minimum for any fixed k≥ 4 is necessarily quasi-random. We present several other characterizations of quasi-random tournaments nicely complementing previously known results and relatively easily following from our proof techniques.
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