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On
the CAT(0) dimension of 2–dimensional Bestvina–Brady
groups
John Crisp |
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Algebraic & Geometric Topology 2 (2002) 921–936
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arXiv: math.GR/0211130 |
Abstract |
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Let be a 2–dimensional finite flag complex. We study the CAT(0) dimension of the ‘Bestvina–Brady group’, or ‘Artin kernel’, . We show that has CAT(0) dimension 3 unless admits a piecewise Euclidean metric of non-positive curvature. We give an example to show that this implication cannot be reversed. Different choices of lead to examples where the CAT(0) dimension is 3, and either (i) the geometric dimension is 2, or (ii) the cohomological dimension is 2 and the geometric dimension is not known. |
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Keywords
nonpositive curvature, dimension, flag complex, Artin group
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Mathematical Subject Classification 2000
Primary: 20F67
Secondary: 57M20
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References |
Forward citations |
Publication
Received: 6 May 2002
Revised: 16 September 2002
Accepted: 12 October 2002
Published: 21 October 2002
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Authors |
| John Crisp | |
| Laboratoire de Topologie Université de Bourgogne UMR 5584 du CNRS BP 47 870 21078 Dijon France |
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