Improved algebraic fibrings

Abstract

We show that a virtually RFRS group G of type FPn(Q) virtually algebraically fibres with kernel of type FPn(Q) if and only if the first n 2-Betti numbers of G vanish, that is, bp(2)(G) = 0 for 0 ≤slant p ≤slant n. 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 FP(Q) are polycyclic-by-finite. It then follows that if G is a virtually RFRS group of type FP(Q) such that ZG is Noetherian, then G is polycyclic-by-finite. This answers a longstanding conjecture of Baer for virtually RFRS groups of type FP(Q).

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