English

Galois-theoretic features for 1-smooth pro-$p$ groups

Group Theory 2021-06-30 v5 Number Theory

Abstract

Let pp be a prime. A pro-pp group GG is said to be 1-smooth if it can be endowed with a continuous representation θ ⁣:GGL1(Zp)\theta\colon G\to\mathrm{GL}_1(\mathbb{Z}_p) such that every open subgroup HH of GG, together with the restriction θH\theta\vert_H, satisfies a formal version of Hilbert 90. We prove that every 1-smooth pro-pp group contains a unique maximal closed abelian normal subgroup, in analogy with a result by Engler and Koenigsmann on maximal pro-pp Galois groups of fields, and that if a 1-smooth pro-pp group is solvable, then it is locally uniformly powerful, in analogy with a result by Ware on maximal pro-pp Galois groups of fields. Finally we ask whether 1-smooth pro-pp groups satisfy a "Tits' alternative".

Keywords

Cite

@article{arxiv.2004.12605,
  title  = {Galois-theoretic features for 1-smooth pro-$p$ groups},
  author = {Claudio Quadrelli},
  journal= {arXiv preprint arXiv:2004.12605},
  year   = {2021}
}

Comments

To appear on "Canadian Math. Bull"

R2 v1 2026-06-23T15:06:52.366Z