Cohomologie analytique des arrangements d'hyperplans

Abstract

In this article, we study the cohomology of some analytic sheaves on the complementary in the projective space of a suitable infinite collection of hyperplane like the Drinfel'd symetric space. In particular, the sheaf of invertible functions on these rigid spaces has no cohomology in degree greater or equal to 1. This proves the vanishing of the Picard goup and the methods used give a convenient description of the global invertible functions.