English

The kernel generating condition and absolute Galois groups

Number Theory 2021-07-01 v2

Abstract

For a list L\cal{L} of finite groups and for a profinite group GG, we consider the intersection T(G)T(G) of all open normal subgroups NN of GG with G/NG/N in L\cal{L}. We give a cohomological characterization of the epimorphisms π ⁣:SG\pi\colon S\to G of profinite groups (satisfying some additional requirements) such that π[T(S)]=T(G)\pi[T(S)]=T(G). For pp prime, this is used to describe cohomologically the profinite groups GG whose nnth term G(n,p)G_{(n,p)} (resp., G(n,p)G^{(n,p)}) in the pp-Zassenhaus filtration (resp., lower pp-central filtration) is an intersection of this form. When G=GFG=G_F is the absolute Galois group of a field FF containing a root of unity of order pp, we recover as special cases results by Minac, Spira and the author, describing G(3,p)G_{(3,p)} and G(3,p)G^{(3,p)} as T(G)T(G) for appropriate lists L\cal{L}.

Keywords

Cite

@article{arxiv.2106.11553,
  title  = {The kernel generating condition and absolute Galois groups},
  author = {Ido Efrat},
  journal= {arXiv preprint arXiv:2106.11553},
  year   = {2021}
}

Comments

Some misprints fixed, polishing of the presentation

R2 v1 2026-06-24T03:27:15.476Z