On refined ramification filtrations in the equal characteristic case

Abstract

Let k be a complete discrete valuation field of equal characteristic p>0. Using the tools of p-adic differential modules, we define refined Artin and Swan conductors for a representation of the absolute Galois group Gk with finite local monodromy; this leads to a description of the subquotients of the ramification filtration on Gk. We prove that our definition of the refined Swan conductors coincide with that is given by Saito, which uses etale cohomology. We also study its relation with the toroidal variation of the Swan conductors.