Chabauty-Kim method in Diophantine geometry II
This course is a sequel of previous semester's (https://bimsa.net/activity/ChametinDiogeo/). We will give a gentle introduction to Chabauty-Kim method, and study concrete examples.
讲师
日期
2026年03月04日 至 06月17日
位置
| Weekday | Time | Venue | Online | ID | Password |
|---|---|---|---|---|---|
| 周三 | 09:50 - 12:15 | A3-1a-205 | ZOOM 08 | 787 662 9899 | BIMSA |
修课要求
Familiarity with the material covered in previous course (e.g. classical Chabauty-Coleman method) will be helpful.
参考资料
1. R. Coleman. "Effective Chabauty", "Torsion points on curves and p-adic abelian integrals"
2. M. Kim. "The motivic fundamental group of P1 \ {0,1,∞} and the theorem of Siegel", "The unipotent Albanese map and Selmer varieties for curves"
3. J. Balakrishnan - N. Dogra. "Quadratic Chabauty and rational points I: p-adic heights", "An effective Chabauty-Kim theorem"
4. More references can be found in Arizona Winter School 2020.
2. M. Kim. "The motivic fundamental group of P1 \ {0,1,∞} and the theorem of Siegel", "The unipotent Albanese map and Selmer varieties for curves"
3. J. Balakrishnan - N. Dogra. "Quadratic Chabauty and rational points I: p-adic heights", "An effective Chabauty-Kim theorem"
4. More references can be found in Arizona Winter School 2020.
听众
Advanced Undergraduate
, Graduate
, 博士后
, Researcher
视频公开
不公开
笔记公开
公开
语言
英文
讲师介绍
Yong Suk Moon于2022年秋作为助理研究员入职BIMSA。他的研究方向包括数论和算术几何。具体而言,他现在的研究集中在p-进霍奇理论,Fontaine-Mazur猜想和p-进Langlands纲领。他于2016年在哈佛大学取得博士学位,之后在普度大学作为访问助理教授工作3年,2019-2022年在美国亚利桑那大学做博士后。