-

Bilu's equidistribution theorem for non-Galois invariant sets

组织者

刁晗生 , 杜衡 , 胡悦科 , Bin Xu , Yihang Zhu

演讲者

阿尔诺·普莱西斯

时间

2025年12月15日 10:00 至 11:00

地点

Shuangqing-B627

摘要

Denote by $h$ the (absolute, logarithmic) Weil height. The celebrated Bilu's equidistribution theorem claims that for any sequence $(x_n)_n$ of algebraic numbers satisfying $[\mathbb{Q}(x_n):\mathbb{Q}] \to +\infty$ and $h(x_n) \to 0$, the sequence of Galois orbits of $x_n$ is equidistributed around the unit circle.

Following a method due to Mignotte, I will explain why every sequence $(S_n)_n$ of finite subsets of algebraic numbers satisfying $\# S_n \to +\infty$ and $\sum_{\alpha \in S_n} (h(\alpha)/ \# S_n) \to 0$ is equidistributed "in average" around the unit circle. This is joint work with Amoroso.

演讲者介绍

Arnaud Plessis is an assistant professor at BIMSA from September 2023. His research is mainly focused on diophantine geometry. He obtained his Phd. thesis in 2019 at Université de Caen Normandie. Before joining BIMSA, he has been Attaché Temporaire d'Enseignement et de Recherche (a kind of postdoctoral with course duties) at Université Grenoble Alpes from September 2019 to August 2020. Then, he has been postdoctor at Morningside Center of Mathematics, Chinese Academy of Sciences, from September 2020 to August 2023.