Intersection of parabolic subgroups in Euclidean braid groups: a short proof

Intersection of parabolic subgroups in Euclidean braid groups: a short proof

We give a short proof for the fact, already proven by Thomas Haettel, that the arbitrary intersection of parabolic subgroups in Euclidean Braid groups $A[\tilde{A}_n]$ is again a parabolic subgroup. To that end, we use that the spherical-type Artin group $A[B_{n+1}]$ is isomorphic to $A[\tilde{A}_n]...

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Bibliographic Details
Main Authors: Cumplido, María, Gavazzi, Federica, Paris, Luis
Format: Article
Language:English
Published: Académie des sciences 2024-11-01
Series:Comptes Rendus. Mathématique
Subjects:
Group theory
Artin groups
Euclidean braid groups
parabolic subgroups
group isomorphism
Online Access:https://comptes-rendus.academie-sciences.fr/mathematique/articles/10.5802/crmath.656/
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Summary:We give a short proof for the fact, already proven by Thomas Haettel, that the arbitrary intersection of parabolic subgroups in Euclidean Braid groups $A[\tilde{A}_n]$ is again a parabolic subgroup. To that end, we use that the spherical-type Artin group $A[B_{n+1}]$ is isomorphic to $A[\tilde{A}_n]\rtimes \mathbb{Z}$ .
ISSN:1778-3569

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