報告人簡介
張磊�����,博士畢業于德國杜伊斯堡-埃森大學�,導師為H′el`ene Esnault教授,現任中山大學(珠海校區)數學科學學院副教授。研究方向為數論與算術幾何,相關研究發表于J.Alg.Geom.,Math.Ann.,Trans.Amer.Math.Soc. 等知名數學期刊����。
內容簡介
B.Bhatt and P. Scholze introduced the notion of the pro-étale fundamental group for a topologically Noetherian scheme X in their celebrated work "The pro-étale cohomology for schemes". This is a topological group that classifies the geometric covers of X. Under the Yoneda embedding, the geometric covers are identified with sheaves of sets which are locally constant sheaves for the pro-étale topology. In particular, the finite étale covers are geometric. Therefore, the pro-étale fundamental group refines Grothendieck's étale fundamental group which classifies only finite étale covers. There is a natural morphism from the pro-étale fundamental group to the étale fundamental group which realizes the étale fundamental group as the profinite completion of the pro-étale fundamental group. However, there has been no direct comparison between the topological and pro-étale fundamental groups. In this talk, we are going to present this comparison. We'll also introduce some comparison theorems in the p-adic setting.
