The convergent stack

Abstract

Inspired by Simpson's de Rham stack and Drinfeld's crystalline stack, we develop a stacky approach to convergent cohomology and convergent isocrystals in positive characteristic. To any scheme X over Fp we attach a convergent stack Xconv. When X is of finite type over a perfect field, its finitely generated quasi-coherent O[1p]-modules are equivalent to convergent isocrystals over X, compatibly with cohomology. When X embeds into a smooth p-adic formal scheme, we describe Xconv explicitly as the quotient of an open tube by a p-adic formal groupoid. For f-semiperfect schemes, by contrast, the convergent stack is representable by a preperfectoid adic space over Qp.