On pattern-avoiding permutons
Abstract
The theory of limits of permutations leads to limit objects called permutons, which are certain Borel measures on the unit square. We prove that permutons avoiding a given permutation of order k have a particularly simple structure. Namely, almost every fiber of the disintegration of the permuton (say, along the x-axis) consists only of atoms, at most (k-1) many, and this bound is sharp. We use this to give a simple proof of the `permutation removal lemma'.
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