Detecting pro-p-groups that are not absolute Galois groups, expanded version
Abstract
We present several constraints on the absolute Galois groups G_F of fields F containing a primitive pth root of unity, using restrictions on the cohomology of index p normal subgroups from a previous paper by three of the authors. We first classify all maximal p-elementary abelian-by-order p quotients of such G_F. In the case p>2, each such quotient contains a unique closed index p elementary abelian subgroup. This seems to be the first case in which one can completely classify nontrivial quotients of absolute Galois groups by characteristic subgroups of normal subgroups. We then derive analogues of theorems of Artin-Schreier and Becker for order p elements of certain small quotients of G_F. Finally, we construct new families of pro-p-groups which are not absolute Galois groups over any field F.
Keywords
Cite
@article{arxiv.math/0610632,
title = {Detecting pro-p-groups that are not absolute Galois groups, expanded version},
author = {Dave Benson and Nicole Lemire and Jan Minac and John Swallow},
journal= {arXiv preprint arXiv:math/0610632},
year = {2007}
}
Comments
38 pages; expanded version of paper with similar title; contains some additional material and further comments and details; expanded version is not intended for publication