Lifting problem for minimally wild covers of Berkovich curves

Abstract

This work continues the study of residually wild morphisms f Y X of Berkovich curves initiated by Cohen, Temkin and Trushin in [CTT16]. The different function δf introduced in [CTT16] is the primary discrete invariant of such covers. When f is not residually tame, it provides a non-trivial enhancement of the classical invariant of f consisting of morphisms of reductions f YX and metric skeletons f YX. In this paper we interpret δf as the norm of the canonical trace section τf of the dualizing sheaf ωf, and introduce a finer reduction invariant τf, which is (loosely speaking) a section of ωf log. Our main result generalizes a lifting theorem of Amini-Baker-Brugall\'e-Rabinoff from the case of residually tame morphism to the case of minimally residually wild morphisms. For such morphisms we describe all restrictions the datum (f,f,δ|_Y,τf) satisfies, and prove that, conversely, any quadruple satisfying these restrictions can be lifted to a morphism of Berkovich curves.