Talk page

Title:
Dieudonné Theory via Prismatic F-gauges

Speaker:
Shubhodip Mondal

Abstract:
In this talk, I will first describe how classical Dieudonne module of finite flat group schemes and p-divisible groups can be recovered from crystalline cohomology of classifying stacks. Then, I will explain how in mixed characteristics, using classifying stacks, one can define Dieudonné module of a finite locally free group scheme as a prismatic F-gauge (prismatic F-gauges have been recently introduced by Drinfeld and Bhatt--Lurie), which gives a fully faithful functor from finite locally free group schemes over a quasi-syntomic algebra to the category of prismatic F-gauges. This can be seen as a generalisation of the work of Anschütz--Le Bras on "prismatic Dieudonne theory" to torsion situations.

Link:
https://www.ias.edu/video/dieudonne-theory-prismatic-f-gauges