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Large scale properties of groups; growth functions; Dehn functions; small cancellation properties; hyperbolicity and CAT(0); actions and representations; combinatorial group theory; presentations

4 votes
1 answer
69 views

$K(\pi,1)$-conjecture ofr Artin groups behave well with respect to special subgroups. Refere...

For a proof for an article I would need the following result: If $A_\Gamma$ is an Artin group such that the $K(\pi,1)$-conjecture holds for it and $\Gamma'\subset\Gamma$ is an induced subgraph, then t …
Marcos's user avatar
  • 447
3 votes
0 answers
144 views

Write an Artin group as an HNN-extension

Assume that $A_\Gamma$ is an Artin group and $\chi:A_\Gamma\to(\mathbb{Z},+)$ is a group homomorphism of the following form. $\Gamma=\Gamma_1\cup\Gamma_2$ with $\Gamma_1\cap\Gamma_2=\emptyset,A_{\Gamm …
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  • 447
2 votes
1 answer
139 views

Quotient of an Artin group is an Artin group

I'm working on a problem about Artin groups, and to simplify this problem I want to take a quotient that allow us to go to an easier Artin group, but I'm not sure if the quotient is well defined. This …
Marcos's user avatar
  • 447
1 vote
1 answer
155 views

Finiteness of $\ell^2$-Betti numbers

I'm reading the paper "Improved algebraic fibering" by Sam Fisher (https://arxiv.org/pdf/2112.00397.pdf) and in the proof of lemma 6.4 it claims the followng: $(\mathcal{D}_{\mathbb{F}K}\ast\mathbb{Z} …
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  • 447
4 votes
1 answer
107 views

Salvetti complex of dihedral Artin group

The Salvetti complex of a RAAG is well-known and it is fairly simple, since each complete graph gives rise to a tori. The case of Artin groups is wilder, since we do not have tori anymore. The constru …
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  • 447