Ramification filtration via deformations, II

Abstract

Let K be a field of formal Laurent series with coefficients in a finite field of characteristic p. For M 1, let G<p,M be the maximal quotient of the Galois group of K of period pM and nilpotent class <p and \ G<p,M(v)\v≥slant 0 -- the ramification subgroups in upper numbering. Let G<p,M=G( L) be the identification of nilpotent Artin-Schreier theory: here G( L) is the group obtained from a suitable profinite Lie Z/pM-algebra L via the Campbell-Hausdorff composition law. We develop new techniques to obtain a ``geometrical'' construction of the ideals L(v) such that G( L(v))= G<p,M(v). Given v0≥slant 1, we construct a decreasing central filtration L(w), 1≤slant w≤slant p, on L, an epimorphism of Lie Z/pM-algebras V: L L:= L/ L(p), and a unipotent action of Z /pM on L , which induces the identity action on L. Suppose d =B , where B ∈Diff L , and L [v0] is the ideal of L generated by the elements of B ( L ). Our main result states that the ramification ideal L(v0) appears as the preimage of the ideal in L generated by VB ( L [v0]). In the last section we apply this to the explicit construction of generators of L(v0). The paper justifies a geometrical origin of ramification subgroups of K and can be used for further developing of non-abelian local class field theory.