On ramification filtrations and p-adic differential modules, I: equal characteristic case

Abstract

Let k be a complete discretely valued field of equal characteristic p > 0 with possibly imperfect residue field and let Gk be its Galois group. We prove that the conductors computed by the arithmetic ramification filtrations on Gk coincide with the differential Artin conductors and Swan conductors of Galois representations of Gk. As a consequence, we give a Hasse-Arf theorem for arithmetic ramification filtrations in this case. As applications, we obtain a Hasse-Arf theorem for finite flat group schemes; we also give a comparison theorem between the differential Artin conductors and Borger's conductors.