English

Ramification filtration via deformations, II

Number Theory 2025-05-22 v5

Abstract

Let K\mathcal K be a field of formal Laurent series with coefficients in a finite field of characteristic pp. For M1M\ge 1, let G<p,M\mathcal G_{<p,M} be the maximal quotient of the Galois group of K\mathcal K of period pMp^M and nilpotent class <p<p and {G<p,M(v)}v0\{\mathcal G_{<p,M}^{(v)}\}_{v\geqslant 0} -- the ramification subgroups in upper numbering. Let G<p,M=G(L)\mathcal G_{<p,M}=G(\mathcal L) be the identification of nilpotent Artin-Schreier theory: here G(L)G(\mathcal L) is the group obtained from a suitable profinite Lie Z/pM\mathbb{Z}/p^M-algebra L\mathcal L via the Campbell-Hausdorff composition law. We develop new techniques to obtain a ``geometrical'' construction of the ideals L(v)\mathcal L^{(v)} such that G(L(v))=G<p,M(v)G(\mathcal L^{(v)})=\mathcal G_{<p,M}^{(v)}. Given v01v_0\geqslant 1, we construct a decreasing central filtration L(w)\mathcal L(w), 1wp1\leqslant w\leqslant p, on L\mathcal L, an epimorphism of Lie Z/pM\mathbb{Z}/p^M-algebras Vˉ:LˉLˉ:=L/L(p)\bar{\mathcal V}:\bar{\mathcal L}^{\dag }\to \bar{\mathcal L}:=\mathcal L/\mathcal L(p), and a unipotent action Ω\Omega of Z/pM\mathbb{Z} /p^M on Lˉ\bar{\mathcal L}^{\dag }, which induces the identity action on Lˉ\bar{\mathcal L}. Suppose dΩ=Bd\Omega =B^{\dag }, where BDiffLˉB^{\dag }\in\operatorname{Diff}\bar{\mathcal L}^{\dag }, and Lˉ[v0]\bar{\mathcal L}^{\dag [v_0]} is the ideal of Lˉ\bar{\mathcal L}^{\dag } generated by the elements of B(Lˉ)B^{\dag }(\bar{\mathcal L}^{\dag }). Our main result states that the ramification ideal L(v0)\mathcal L^{(v_0)} appears as the preimage of the ideal in Lˉ\bar{\mathcal L} generated by VˉB(Lˉ[v0])\bar{\mathcal V}B^{\dag }(\bar{\mathcal L}^{\dag [v_0]}). In the last section we apply this to the explicit construction of generators of Lˉ(v0)\bar{\mathcal L}^{(v_0)}. The paper justifies a geometrical origin of ramification subgroups of ΓK\Gamma _K and can be used for further developing of non-abelian local class field theory.

Keywords

Cite

@article{arxiv.2402.04053,
  title  = {Ramification filtration via deformations, II},
  author = {Victor Abrashkin},
  journal= {arXiv preprint arXiv:2402.04053},
  year   = {2025}
}

Comments

38 pages

R2 v1 2026-06-28T14:40:13.905Z