Wednesday, November 1, 2023
Time | Items |
---|---|
All day |
|
4:00pm |
11/01/2023 - 4:00pm Abstract: A theorem of Borel says that any holomorphic map from a complex algebraic variety to a smooth arithmetic variety is automatically an algebraic map. The key ingredient is to show that any holomorphic map from the (poly) punctured disc to the Baily-Borel compactification of the arithmetic variety has no essential singularity. I will discuss p-adic analogue of these facts for Shimura varieties of abelian type. Joint with Abhishek Oswal and Ananth Shankar (with an appendix by Anand Patel). Location:
KT 219
|