Jacopo

We study longest and shortest directed paths in the following natural model of directed random planar maps: the uniform infinite bipolar-oriented triangulation (UIBOT), which is the local limit of uniform bipolar-oriented triangulations around a typical edge. We construct the Busemann function which measures directed distance to along a natural interface in the UIBOT. We show …

[24] Directed distances in bipolar-oriented triangulations: exact exponents and scaling limits (with Ewain Gwynne).Read More »

We investigate the asymptotic properties of permutations drawn from the Luce model, a natural probabilistic framework in which permutations are generated sequentially by sampling without replacement, with selection probabilities proportional to prescribed positive weights. These permutations arise in applications such as ranking models, the Tsetlin library, and related Markov processes. Under minimal assumptions on the …

[23] Permuton and local limits for the Luce model (with Sourav Chatterjee and Persi Diaconis).Read More »

In the context of two-dimensional large- lattice Yang–Mills theory, we perform a refined study of the surface sums defined in the companion work [19]. In this setting, the surface sums are a priori expected to exhibit significant simplifications, because two-dimensional Yang–Mills theory is a special model admitting many known exact formulas. Thus, a natural problem is …

[22] Surface sums in two-dimensional large-N lattice Yang–Mills: Cancellations and explicit computation for general loops (with Sky Cao and Jasper Shogren-Knaak).Read More »

We establish a scaling limit result for the length LIS of the longest increasing subsequence of a permutation  of size  sampled from the Brownian separable permuton  of parameter , which is the universal limit of pattern-avoiding permutations. Specifically, we prove that    where   is the unique solution in the interval  to the equation    and  is a non-deterministic …

[21] The longest increasing subsequence of Brownian separable permutons (with Arka Adhikari, Thomas Budzinski, William Da Silva, Delphin Sénizergues).Read More »

Permutons, which are probability measures on the unit square with uniform marginals, are the natural scaling limits for sequences of (random) permutations. We introduce a -dimensional generalization of these measures for all , which we call –dimensional permutons, and extend — from the two-dimensional setting — the theory to prove convergence of sequences of (random) …

[20] High-dimensional permutons: theory and applications (with Andrew Lin).Read More »