The longest increasing subsequence of Brownian separable permutons

Abstract

We establish a scaling limit result for the length LIS(σn) of the longest increasing subsequence of a permutation σn of size n sampled from the Brownian separable permuton μp of parameter p∈(0,1), which is the universal limit of pattern-avoiding permutations. Specifically, we prove that \[LIS(σn)nα\;n∞a.s.\; X,\] where α=α(p) is the unique solution in the interval (1/2,1) to the equation \[1412απ\,(12-12α)(1-12α)=pp-1,\] and X=X(p) is a non-deterministic and a.s. positive and finite random variable, which is a measurable function of the Brownian separable permuton. Notably, the exponent α(p) is an increasing continuous function of p with α(0+)=1/2, α(1-)=1 and α(1/2)≈0.815226, which corresponds to the permuton limit of uniform separable permutations. We prove analogous results for the size of the largest clique of a graph sampled from the Brownian cographon of parameter p∈(0,1).