An arithmetic \'etale-crystalline comparison with coefficients in crystalline local systems

Abstract

We use the stacky approach to p-adic cohomology theories recently developed by Drinfeld and Bhatt--Lurie to generalise a comparison theorem 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 due to Colmez--Niziol to the case of coefficients in an arbitrary crystalline local system on the generic fibre of X. In the process, we 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. Our methods also yield a description of the isogeny category of perfect F-gauges on Zp.