A Dynamical Analogue of Sen's Theorem

We study the higher ramification structure of dynamical branch extensions and propose a connection between the natural dynamical filtration and the filtration arising from the higher ramification groups: each member of the former should, after a linear change of index, coincide with a member of the latter. This is an analogue of Sen's theorem on ramification in p-adic Lie extensions. By explicitly calculating the Hasse-Herbrand functions of such branch extensions, we are able to show that this description is accurate for some families of polynomials, in particular post-critically bounded polynomials of p-power degree. We apply our results to give a partial answer to a question of Berger [8] and a partial answer to a question about wild ramification in arboreal extensions of number fields [1, 9].