Integral p-adic Hodge Theory

A summer reading seminar co-organized by Raymond Cheng and Shizhang Li

The aim of this seminar is to gain an understanding of the (relatively) recent work of Bhatt–Morrow–Scholze on integral \(p\)-adic Hodge theory.

References

The primary reference, of course, is the paper of Bhatt–Morrow–Scholze listed below. Besides that, however, Bhatt and Morrow have each written additional articles that explain specific aspects of the main paper.

  1. Bhargav Bhatt, Matthew Morrow, and Peter Scholze, Integral \(p\)-adic Hodge theory.

  2. Bhargav Bhatt, Specializing varieties and their cohomology from characteristic \(0\) to characteristic \(p\).

  3. Matthew Morrow, Notes on the \(\mathbf{A}_{\mathrm{inf}}\) cohomology of Integral \(p\)-adic Hodge theory.

Schedule

We meet Thursdays in Mathematics Room 407 between 2:00PM and 3:30PM.

01/23
Organization.
05/17
Shizhang Li
Background
05/24
Shizhang Li
Almost Purity and Primitive Comparison
05/31
Qixiao Ma
\(L\eta\)
06/07
TBA
The complex \(\widetilde\Omega_{\mathfrak{X}}\)
06/14
Shizhang Li
Breuil—Kisin—Fargues modules
06/21
Shizhang Li
Rational \(p\)-adic Hodge theory
06/28
Zijian Yao
The complex \(A\Omega_{\mathfrak{X}}\)
07/05
Qixiao Ma
Global results
07/12
Shizhang Li
Relative de Rham—Witt complex
07/19
Raymond Cheng
Comparison with de Rham—Witt complexes
07/20
Zijian Yao
Comparison with crystalline cohomology over \(A_\mathrm{crys}\)