Locally analytic vector bundles on the Fargues-Fontaine curve

Abstract

In this article, we develop a version of Sen theory for equivariant vector bundles on the Fargues-Fontaine curve. We show that every equivariant vector bundle canonically descends to a locally analytic vector bundle. A comparison with the theory of (,)-modules in the cyclotomic case then recovers the Cherbonnier-Colmez decompletion theorem. Next, we focus on the subcategory of de Rham locally analytic vector bundles. Using the p-adic monodromy theorem, we show that each locally analytic vector bundle E has a canonical differential equation for which the space of solutions has full rank. As a consequence, E and its sheaf of solutions Sol(E) are in a natural correspondence, which gives a geometric interpretation of a result of Berger on (,)-modules. In particular, if V is a de Rham Galois representation, its associated filtered (,N,GK)-module is realized as the space of global solutions to the differential equation. A key to our approach is a vanishing result for the higher locally analytic vectors of representations satisfying the Tate-Sen formalism, which is also of independent interest.