English

Bieri-Eckmann Criteria for Profinite Groups

Group Theory 2015-01-16 v2

Abstract

In this paper we derive necessary and sufficient homological and cohomological conditions for profinite groups and modules to be of type FPn\operatorname{FP}_n over a profinite ring RR, analogous to the Bieri-Eckmann criteria for abstract groups. We use these to prove that the class of groups of type FPn\operatorname{FP}_n is closed under extensions, quotients by subgroups of type FPn\operatorname{FP}_n, proper amalgamated free products and proper HNN\operatorname{HNN}-extensions, for each nn. We show, as a consequence of this, that elementary amenable profinite groups of finite rank are of type FP\operatorname{FP}_\infty over all profinite RR. For any class C\mathcal{C} of finite groups closed under subgroups, quotients and extensions, we also construct pro-C\mathcal{C} groups of type FPn\operatorname{FP}_n but not of type FPn+1\operatorname{FP}_{n+1} over ZC^\mathbb{Z}_{\hat{\mathcal{C}}} for each nn. Finally, we show that the natural analogue of the usual condition measuring when pro-pp groups are of type FPn\operatorname{FP}_n fails for general profinite groups, answering in the negative the profinite analogue of a question of Kropholler.

Keywords

Cite

@article{arxiv.1412.1703,
  title  = {Bieri-Eckmann Criteria for Profinite Groups},
  author = {Ged Corob Cook},
  journal= {arXiv preprint arXiv:1412.1703},
  year   = {2015}
}

Comments

Revised version. Proposition 4.2 now applies to elementary amenable profinite groups, rather than just soluble ones

R2 v1 2026-06-22T07:20:35.183Z