On the cohomology of p-adic analytic spaces, I: The basic comparison theorem

Abstract

The purpose of this paper is to prove a basic p-adic comparison theorem for smooth rigid analytic and dagger varieties over the algebraic closure C of a p-adic field: p-adic pro-\'etale cohomology, in a stable range, can be expressed as a filtered Frobenius eigenspace of de Rham cohomology (over B+ dR). The key computation is the passage from absolute crystalline cohomology to Hyodo-Kato cohomology and the construction of the related Hyodo-Kato isomorphism. We also "geometrize" our comparison theorem by turning p-adic pro-\'etale and syntomic cohomologies into sheaves on the category PerfC of perfectoid spaces over C (this geometrization will be crucial in our proof of the C st-conjecture in the sequel to this paper).