A p-Adic 6-Functor Formalism in Rigid-Analytic Geometry

Abstract

We develop a full 6-functor formalism for p-torsion \'etale sheaves in rigid-analytic geometry. More concretely, we use the recently developed condensed mathematics by Clausen--Scholze to associate to every small v-stack (e.g. rigid-analytic variety) X with pseudouniformizer π an ∞-category Da( O+X/π) of "derived quasicoherent complete topological O+X/π-modules" on X. We then construct the six functors , Hom, f*, f*, f! and f! in this setting and show that they satisfy all the expected compatibilities, similar to the -adic case. By introducing -module structures and proving a version of the p-torsion Riemann-Hilbert correspondence we relate O+X/π-sheaves to Fp-sheaves. As a special case of this formalism we prove Poincar\'e duality for Fp-cohomology on rigid-analytic varieties. In the process of constructing Da( O+X/π) we also develop a general descent formalism for condensed modules over condensed rings.