Rational p-adic Hodge theory for d-de Rham-proper stacks

Abstract

In this follow-up paper we show that smooth Hodge-proper stacks over OK are Qp-locally acyclic: namely the natural map between \'etale Qp-cohomology of the algebraic and Raynaud generic fibers is an equivalence. This establishes the Qp-case of general conjectures made in our previous work. As a corollary, we get that if a smooth Artin stack over K has a smooth Hodge-proper model over OK, its Qp-\'etale cohomology is a crystalline Galois representation. We then also establish a truncated version of the above results in more general setting of smooth d-de Rham-proper stacks over OK: here we only require first d de Rham cohomology groups be finitely-generated over OK. As an application, we deduce a certain purity-type statement for \'etale Qp-cohomology of Raynaud generic fiber, as well as crystallinity of a first several \'etale cohomology groups in the presence of a Cohen--Macauley model over OK in the schematic setting.

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