\'Equations pour le premier rev\etement de l'espace sym\'etrique de Drinfeld

Abstract

The goal of this work is to study some aspects of the geometry of the first cover 1 in the Drinfeld tower over HdK the Drinfeld symmetric space over K a finite extension of Qp. It is a cyclic \'etale cover of order prime to p and even of Kummer type from the vanishing of the Picard group of HdK shown in a previous work of the author. It is then completely described by a certain class of invertible functions on HdK via the Kummer exact sequence and the main result of this article gives an explicit description of this class thus providing "equations" for 1. This statement extends and uses crucially the local description over a vertex obtained by Wang (and originally by Teitelbaum in dimension 1). One of the main consequence of our global equation is the description of invertible functions of 1 in terms of the invertible functions of HdK.