Variance vs. range for linear extensions, and balancing extensions in posets of bounded width
Abstract
An old conjecture of Kahn and Saks says, roughly, that any poset P of large enough width contains elements x,y which are "balanced" in the sense that the probability that x precedes y in a uniformly random linear extension of P is close to 1/2. We show this implies the seemingly stronger statement that the same conclusion holds if, instead of large width, we assume only that, for some x, the number, π(x), of elements of P incomparable to x is large. The implication follows from our two main results: first, that if π(P):= π(x) is large then P has large variance, i.e. there is a y whose position in a uniform extension of P has large variance; and second, that the conclusion of the Kahn-Saks Conjecture holds for P with large variance and bounded width. These two assertions also yield an easy proof of a (not easy) result of Chan, Pak and Panova on "sorting probabilities" for Young diagrams, together with its natural generalization to higher dimensions.
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