Metric uniformization of morphisms of Berkovich curves

Abstract

We show that the metric structure of morphisms f Y X between quasi-smooth compact Berkovich curves over an algebraically closed field admits a finite combinatorial description. In particular, for a large enough skeleton =(Y,X) of f, the sets Nf, n of points of Y of multiplicity at least n in the fiber are radial around Y with the radius changing piecewise monomially along Y. In this case, for any interval l=[z,y]⊂ Y connecting a rigid point z to the skeleton, the restriction f|l gives rise to a profile piecewise monomial function y [0,1][0,1] that depends only on the type 2 point y∈Y. In particular, the metric structure of f is determined by and the family of the profile functions \y\ with y∈Y(2). We prove that this family is piecewise monomial in y and naturally extends to the whole Yhyp. In addition, we extend the theory of higher ramification groups to arbitrary real-valued fields and show that y coincides with the Herbrand's function of H(y)/H(f(y)). This gives a curious geometric interpretation of the Herbrand's function, which applies also to non-normal and even inseparable extensions.