Improved algebraic fibrings
Abstract
We show that a virtually RFRS group of type virtually algebraically fibres with kernel of type if and only if the first -Betti numbers of vanish, that is, for . We also offer a variant of this result over other fields, in particular in positive characteristic. As an application of the main result, we show that virtually amenable RFRS groups of type are polycyclic-by-finite. It then follows that if is a virtually RFRS group of type such that is Noetherian, then is polycyclic-by-finite. This answers a longstanding conjecture of Baer for virtually RFRS groups of type .
Keywords
Cite
@article{arxiv.2112.00397,
title = {Improved algebraic fibrings},
author = {Sam P. Fisher},
journal= {arXiv preprint arXiv:2112.00397},
year = {2024}
}
Comments
Version accepted for publication at Compositio Mathematica. An addendum (which will appear in the author's thesis, not in the published version of this article) has been added, giving a simple proof that virtually locally indicable groups of finite cohomological dimension satisfy Baer's Conjecture. This was proven in the previous version under the stronger assumptions RFRS and finite type