A Lefschetz Hyperplane Theorem for non-Archimedean Jacobians

Abstract

We establish a Lefschetz hyperplane theorem for the Berkovich analytifications of Jacobians of curves over an algebraically closed non-Archimedean field. Let J be the Jacobian of a curve X, and let Wd ⊂ J be the locus of effective divisor classes of degree d. We show that the pair (Jan,Wdan) is d-connected, and thus in particular the inclusion of the analytification of the theta divisor an into Jan satisfies a Lefschetz hyperplane theorem for Z-cohomology groups and homotopy groups. A key ingredient in our proof is a generalization, over arbitrary characteristics and allowing arbitrary singularities on the base, of a result of Brown and Foster for the homotopy type of analytic projective bundles.