A stacky approach to p-adic Hodge theory

Abstract

We use the stacky approach to p-adic cohomology theories recently developed by Drinfeld and Bhatt--Lurie to generalise known comparison theorems in p-adic Hodge theory so as to accommodate coefficients. More precisely, we establish a comparison between the rational crystalline cohomology of the special fibre and the rational p-adic \'etale cohomology of the arithmetic generic fibre of any proper p-adic formal scheme X which allows for coefficients in any crystalline local system on the generic fibre of X; moreover, we also prove a comparison between the Nygaard filtration and the Hodge filtration for coefficients in an arbitrary gauge in the sense of Bhatt--Lurie. In the process, we develop a stacky approach to diffracted Hodge cohomology as introduced by Bhatt--Lurie, establish a version of the Beilinson fibre square of Antieau--Mathew--Morrow--Nikolaus with coefficients in the proper case and prove a comparison between syntomic cohomology and p-adic \'etale cohomology with coefficients in an arbitrary F-gauge. This work is the author's master's thesis at the University of Bonn.