Metric uniformization of morphisms of Berkovich curves via p-adic differential equations

Abstract

We consider a finite \'etale morphism f:Y X of quasi-smooth Berkovich curves over a complete nonarchimedean non-trivially valued field k, assumed algebraically closed and of characteristic 0, and a skeleton f=(Y,X) of the morphism f. We prove that f radializes f if and only if X controls the pushforward of the constant p-adic differential equation f*(OY,dY). Furthermore, when f is a finite \'etale morphism of open unit discs, we prove that f is radial if and only if the number of preimages of a point x∈ X, counted without multiplicity, only depends on the radius of the point x.