Minimal Surfaces in Spheres from Random Permutations
报告人:Antoine Song (California Institute of Technology)
时间:2024-03-27 09:00-10:00
地点:Online(Zoom: 836 0795 5992)
Abstract: The main result I will discuss states that there exists a sequence of closed minimal surfaces in high-dimensional Euclidean spheres which converge (around most points) to the hyperbolic plane. The proof is based on a surprising connection between minimal surfaces in spheres, random permutations and convergence of unitary representations.
Biography: Antoine Song is an assistant professor at Caltech. He obtained his PhD at Princeton with Fernando Codá Marques, before going to UC Berkeley for a postdoc. One of his current research interests is to connect minimal surface theory with other fields like representation theory.
Zoom Link Meeting ID: 836 0795 5992 Password: 960544
