The Hodge-Tate and crystalline comparison theorems
Avi Zeff (Columbia)
Abstract: We will briefly review crystalline cohomology and its relationship to prismatic cohomology, and sketch a proof of the crystalline comparison theorem and of the Hodge-Tate comparison theorem as a corollary.
References: Lecture VI of Bhatt's notes. For more details, see the Bhatt-Scholze paper.
algebraic geometrynumber theory
Audience: advanced learners
Series comments: STAGE (Seminar on Topics in Arithmetic, Geometry, Etc.) is a learning seminar in algebraic geometry and number theory, featuring speakers talking about work that is not their own. Talks will be at a level suitable for graduate students. Everyone is welcome.
Spring 2024 topic: The contents of Serre, Lectures on the Mordell-Weil theorem
Some topics might take more or less time than allotted. If a speaker runs out of time on a certain date, that speaker might be allowed to borrow some time on the next date. So the topics below might not line up exactly with the dates below.
Organizers: | Raymond van Bommel*, Edgar Costa*, Bjorn Poonen*, Shiva Chidambaram* |
*contact for this listing |