A Riemann-Hurwitz Formula for Skeleta in Non-Archimedean Geometry

Abstract

Let φ : C' C be a finite morphism between smooth, projective, irreducible curves defined over a non-archimedean valued, algebraically closed field k. This morphism induces a morphism between the analytifications of the curves. We will construct a compatible pair of deformation retractions of C'an and Can whose images C'an and Can are closed subspaces of C'an and Can which are homeomorphic to finite metric graphs. We refer to such closed subspaces as skeleta. In addition, the subspaces C'an and Can are such that their complements in the two analytifications decompose into the disjoint union of Berkovich open balls and annuli. To these skeleta we can associate a genus. The pair of compatible deformation retractions forces the morphism φan to restrict to a map C'an Can. We will study how the genus of C'an can be calculated using the morphism φan: C'an Can.