Geodesic
On the Finiteness length of some soluble linear groups
Canadian journal of mathematics, Tome 74 (2022) no. 5, pp. 1209-1243

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DOI

Given a commutative unital ring R, we show that the finiteness length of a group G is bounded above by the finiteness length of the Borel subgroup of rank one $\textbf {B}_2^{\circ }(R)=\left ( \begin {smallmatrix} * & * \\ 0 & * \end {smallmatrix}\right )\leq\operatorname {\textrm {SL}}_2(R)$ whenever G admits certain R-representations with metabelian image. Combined with results due to Bestvina–Eskin–Wortman and Gandini, this gives a new proof of (a generalization of) Bux’s equality on the finiteness length of S-arithmetic Borel groups. We also give an alternative proof of an unpublished theorem due to Strebel, characterizing finite presentability of Abels’ groups $\textbf {A}_n(R) \leq \operatorname {\textrm {GL}}_n(R)$ in terms of n and $\textbf {B}_2^{\circ }(R)$. This generalizes earlier results due to Remeslennikov, Holz, Lyul’ko, Cornulier–Tessera, and points out to a conjecture about the finiteness length of such groups.
DOI : 10.4153/S0008414X21000213
Mots-clés : Finiteness properties, soluble group schemes, S-arithmetic groups, Abels’ groups 
Rego, Yuri Santos. On the Finiteness length of some soluble linear groups. Canadian journal of mathematics, Tome 74 (2022) no. 5, pp. 1209-1243. doi: 10.4153/S0008414X21000213
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