Dimension drop in residual chains
We give a description of the Linnell division ring of a countable residually (poly-$\mathbb Z$ virtually nilpotent) (RPVN) group in terms of a generalised Novikov ring, and show that vanishing top-degree cohomology of a finite type group $G$ with coefficients in this Novikov ring implies the existen...
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Zusammenfassung: | We give a description of the Linnell division ring of a countable residually
(poly-$\mathbb Z$ virtually nilpotent) (RPVN) group in terms of a generalised
Novikov ring, and show that vanishing top-degree cohomology of a finite type
group $G$ with coefficients in this Novikov ring implies the existence of a
normal subgroup $N \leqslant G$ such that $\mathrm{cd}_{\mathbb Q}(N) <
\mathrm{cd}_{\mathbb Q}(G)$ and $G/N$ is poly-$\mathbb Z$ virtually nilpotent.
As a consequence, we show that if $G$ is an RPVN group of finite type, then
its top-degree $\ell^2$-Betti number vanishes if and only if there is a
poly-$\mathbb Z$ virtually nilpotent quotient $G/N$ such that
$\mathrm{cd}_{\mathbb Q}(N) < \mathrm{cd}_{\mathbb Q}(G)$. In particular,
finitely generated RPVN groups of cohomological dimension $2$ are virtually
free-by-nilpotent if and only if their second $\ell^2$-Betti number vanishes,
and therefore $2$-dimensional RPVN groups with vanishing second $\ell^2$-Betti
number are coherent. As another application, we show that if $G$ is a finitely
generated parafree group with $\mathrm{cd}(G) = 2$, then $G$ satisfies the
Parafree Conjecture if and only if the terms of its lower central series are
eventually free. Note that the class of RPVN groups contains all finitely
generated RFRS groups and all finitely generated residually torsion-free
nilpotent groups. |
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DOI: | 10.48550/arxiv.2410.08153 |