题目：

P-adic Hodge theory and arithmetic

报告人：谭福成

（日本京都大学数理研究所）

Abstract : This talk is an introduction to several topics centered in p-adic Hodge theory. P-adic Hodge theory, initiated by Serre, Tate and Grothendieck, became a central topic in Arithmetic Geometry soon after Wiles' work on the Taniyama-Shimura conjecture. After recalling the basics in Galois representations and modular forms, I will explain some aspects of the modularity conjectures and the etale-crystalline comparison theorems. Time permitting, I will mention certain developments in Anabelian Geometry, which is in some sense an application of p-adic Hodge theory.

时间： 5月27日（周一），14:00-16:00

地点：565net必赢客户端本部教二楼 613 教室

联系人：童纪龙

欢迎全体师生积极参加！