A Dieudonn\'e theory for analytic p-divisible groups and applications to Shimura varieties

Abstract

We study families of analytic p-divisible groups over adic spaces S defined over Qp. We prove an equivalence between such families and Hodge-Tate triples, generalizing a theorem of Fargues. For a perfectoid space S, we construct a functor associating to an analytic p-divisible group G → S a coherent sheaf E(G) on the relative Fargues--Fontaine curve XS. Restricting to analytic p-divisible groups admitting a Cartier dual, we obtain an equivalence of categories with local shtukas satisfying a minuscule condition, compatible with the prismatic Dieudonn\'e theory of Ansch\"utz--Le Bras. We conclude with applications to moduli spaces: we show that the local Shimura varieties of EL and PEL types of Scholze--Weinstein are moduli spaces of analytic p-divisible groups with extra structure, and we give a reinterpretation of the Hodge--Tate period map of Scholze in terms of topologically p-torsion subgroups of abelian varieties.