A counter-intuitive correlation in a random tournament
Abstract
Consider a randomly oriented graph G=(V,E) and let a, s and b be three distinct vertices in V. We study the correlation between the events \a s\ and \s b\. We show that, when G is the complete graph Kn, the correlation is negative for n=3, zero for n=4, and that, counter-intuitively, it is positive for n 5. We also show that the correlation is always negative when G is a cycle, Cn, and negative or zero when G is a tree (or a forest).
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