English

Monotone Subsequences in Locally Uniform Random Permutations

Probability 2023-03-07 v2 Combinatorics

Abstract

A locally uniform random permutation is generated by sampling nn points independently from some absolutely continuous distribution ρ\rho on the plane and interpreting them as a permutation by the rule that ii maps to jj if the iith point from the left is the jjth point from below. As nn tends to infinity, decreasing subsequences in the permutation will appear as curves in the plane, and by interpreting these as level curves, a union of decreasing subsequences give rise to a surface. We show that, under the correct scaling, for any r0r\ge0, the largest union of rn\lfloor r\sqrt{n}\rfloor decreasing subsequences approaches a limit surface as nn tends to infinity, and the limit surface is a solution to a specific variational problem. As a corollary, we prove the existence of a limit shape for the Young diagram associated to the random permutation under the Robinson-Schensted correspondence. In the special case where ρ\rho is the uniform distribution on the diamond x+y<1|x|+|y|<1 we conjecture that the limit shape is triangular, and assuming the conjecture is true we find an explicit formula for the limit surfaces of a uniformly random permutation and recover the famous limit shape of Vershik, Kerov and Logan, Shepp.

Keywords

Cite

@article{arxiv.2207.11505,
  title  = {Monotone Subsequences in Locally Uniform Random Permutations},
  author = {Jonas Sjöstrand},
  journal= {arXiv preprint arXiv:2207.11505},
  year   = {2023}
}

Comments

49 pages, accepted by Annals of Probability

R2 v1 2026-06-25T01:10:10.851Z