p-adic hyperbolicity for Shimura varieties and period images

Abstract

We prove that Shimura varieties and geometric period images satisfy a p-adic extension property for large enough primes p. More precisely, let D×⊂ D denote the inclusion of the closed punctured unit disc in the closed unit disc. Let X be either a Shimura variety or a geometric period image with torsion-free level structure. Let F be a discretely valued p-adic field containing the number field of definition of X, where p is a large enough prime. Then, any rigid-analytic map f: (D×)a × Db → XFan defined over F whose image intersects the good reduction locus of XFan (with respect to an integral canonical model) extends to a map Da+b→ XFan. We note that this hypothesis is vacuous if X is proper. We also deduce an application to algebraicity of rigid-analytic maps. Our methods also apply to the more general situation of the rigid generic fiber of formal schemes admitting Fontaine-Laffaile modules which satisfy certain positivity conditions.