MARTA MAZZOCCO TBA Room: 7th floow

GUIDO CARLET, TBA Room: 7th floow

PAOLO ROSSI, TBA Room: 7th floow

GAETAN BOROT, Gaussian fluctuations in random lozenge tilings and the Kenyon-Okounkov conjecture Room: 7th floow I will describe results for the macroscopic asymptotics in random lozenge tilings in a large class of two-dimensional domains, in particular identifying Gaussian free field fluctuations for the height field. The results rely on an analysis on a discrete Coulomb gas extending the one known for invariant ensembles of random matrices. This is based on the joint work https://arxiv.org/abs/2601.16377 with Vadim Gorin and Alice Guionnet

GIULIO RUZZA Multiplicative statistics of Poissonized Plancherel random partitions Room: 7th floow After reviewing the Plancherel measure on partitions and its relevance in combinatorics and (asymptotic) representation theory, I will introduce a class of multiplicative statistics of Poissonized Plancherel random partitions. Their study is motivated by connections to integrable systems (Toda equations) and to important stochastic growth models (polynuclear growth models). In particular, with Mattia Cafasso and Matteo Mucciconi we tackled the asymptotic study of these statistics. Building on the log-gas structure of the Poissonized Plancherel measure we derived optimal shapes for Poissonized Plancherel random partitions (which generalize the celebrated Vershik-Kerov-Logan-Shepp density and exhibit new behaviors naturally described in terms of elliptic functions) as well as refined asymptotic expansions for the statistics themselves.

MARCO BERTOLA, TBA Room: 7th floow

DIRECTOR PRESENTATION Room: 7th floow

MEDIALAB and LMP presentation Room: 7th floow

Elba Garcia-Failde, Whispers of Topological Recursions: The negative Witten conjecture and a universal duality Room: 7th floow opological recursion (TR) is a universal procedure that helps connect diverse areas of mathematics and physics. Starting from a spectral curve—a Riemann surface equipped with additional data—it produces a family of differentials that often encode enumerative invariants, such as volumes of moduli spaces, matrix model correlators, and intersection numbers. After a brief introduction, we explore two stories, in principle unrelated to, yet guided by, TR—almost in a whisper—towards their resolution: Witten conjectured that the generating series of psi-class intersection numbers is a tau function of the KdV hierarchy, a result first proved by Kontsevich. Norbury later conjectured an analogous statement for intersection numbers of psi-classes times a negative square root of the canonical bundle. We prove Norbury’s conjecture and derive polynomial relations among kappa-classes. We further introduce a new cohomological field theory (CohFT): the negative analogue of Witten’s r-spin CohFT. We show that its intersection numbers are recursively computable via W-constraints and obtain new tautological relations on the moduli space of curves. The generating series of maps—graphs embedded on surfaces—obeys TR. Exchanging the roles of x and y in the initial data of TR transforms these maps into fully simple maps. Ordinary and fully simple maps are related via monotone Hurwitz numbers, unveiling a universal duality. This duality translates into functional relations between moments and free cumulants, resolving an open problem in free probability that generalises Voiculescu’s R-transform. In this way, we uncover a general theory of freeness which takes into account higher genus corrections and captures the full, all-order asymptotic behaviour of random matrices.

Yang Li, Metric SYZ conjecture Room: 7th floow The Strominger-Yau-Zaslow conjecture asks for a special Lagrangian fibration on the generic region of a Calabi-Yau manifold close to the large complex structure limit. I will give a survey talk for the recent progress on this question.