Birth of Garside groups in memory of Patrick Dehornoy
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Publication:5099111
DOI10.1142/S0218216522400041OpenAlexW4280528760MaRDI QIDQ5099111
Publication date: 31 August 2022
Published in: Journal of Knot Theory and Its Ramifications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0218216522400041
Cites Work
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- Garside families and Garside germs
- Groups with a complemented presentation
- Artin groups of finite type are biautomatic
- Solving the conjugacy problem in Garside groups by cyclic sliding.
- Theorem proving by chain resolution
- Gaussian groups are torsion free
- A note on words in braid monoids
- Geodesic automation and growth functions for Artin groups of finite type
- Parabolic subgroups of Artin groups
- Centralizers of parabolic subgroups of Artin groups of type \(A_l\), \(B_l\), and \(D_l\)
- Homology of Gaussian groups.
- On the linearity of Artin braid groups.
- Artin groups of Euclidean type
- Bestvina's normal form complex and the homology of Garside groups.
- Linearity of Artin groups of finite type.
- Proof of the \(K(\pi,1)\) conjecture for affine Artin groups
- Foundations of Garside theory
- Finite complex reflection arrangements are \(K(\pi,1)\)
- Les immeubles des groupes de tresses généralises
- Artin-Gruppen und Coxeter-Gruppen
- THE CONJUGACY PROBLEM IN SMALL GAUSSIAN GROUPS
- Groupes de Garside
- Braid Groups and Left Distributive Operations
- Gaussian Groups and Garside Groups, Two Generalisations of Artin Groups
- THE BRAID GROUP AND OTHER GROUPS
- Braid groups are linear
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