Extrinsic versus intrinsic diameter for Riemannian filling-discs and van Kampen diagrams
The diameter of a disc filling a loop in the universal covering of a Riemannian manifold may be measured extrinsically using the distance function on the ambient space or intrinsically using the induced length metric on the disc. Correspondingly, the diameter of a van Kampen diagram filling a word t...
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Format: | Journal article |
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2005
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author | Bridson, M Riley, T |
author_facet | Bridson, M Riley, T |
author_sort | Bridson, M |
collection | OXFORD |
description | The diameter of a disc filling a loop in the universal covering of a Riemannian manifold may be measured extrinsically using the distance function on the ambient space or intrinsically using the induced length metric on the disc. Correspondingly, the diameter of a van Kampen diagram filling a word that represents the identity in a finitely presented group can either be measured intrinsically its 1-skeleton or extrinsically in the Cayley graph of the group. We construct the first examples of closed manifolds and finitely presented groups for which this choice -- intrinsic versus extrinsic -- gives rise to qualitatively different min-diameter filling functions. |
first_indexed | 2024-03-07T03:30:34Z |
format | Journal article |
id | oxford-uuid:ba934e0c-4ff6-46c8-a53f-49820ff596de |
institution | University of Oxford |
last_indexed | 2024-03-07T03:30:34Z |
publishDate | 2005 |
record_format | dspace |
spelling | oxford-uuid:ba934e0c-4ff6-46c8-a53f-49820ff596de2022-03-27T05:10:47ZExtrinsic versus intrinsic diameter for Riemannian filling-discs and van Kampen diagramsJournal articlehttp://purl.org/coar/resource_type/c_dcae04bcuuid:ba934e0c-4ff6-46c8-a53f-49820ff596deSymplectic Elements at Oxford2005Bridson, MRiley, TThe diameter of a disc filling a loop in the universal covering of a Riemannian manifold may be measured extrinsically using the distance function on the ambient space or intrinsically using the induced length metric on the disc. Correspondingly, the diameter of a van Kampen diagram filling a word that represents the identity in a finitely presented group can either be measured intrinsically its 1-skeleton or extrinsically in the Cayley graph of the group. We construct the first examples of closed manifolds and finitely presented groups for which this choice -- intrinsic versus extrinsic -- gives rise to qualitatively different min-diameter filling functions. |
spellingShingle | Bridson, M Riley, T Extrinsic versus intrinsic diameter for Riemannian filling-discs and van Kampen diagrams |
title | Extrinsic versus intrinsic diameter for Riemannian filling-discs and van
Kampen diagrams |
title_full | Extrinsic versus intrinsic diameter for Riemannian filling-discs and van
Kampen diagrams |
title_fullStr | Extrinsic versus intrinsic diameter for Riemannian filling-discs and van
Kampen diagrams |
title_full_unstemmed | Extrinsic versus intrinsic diameter for Riemannian filling-discs and van
Kampen diagrams |
title_short | Extrinsic versus intrinsic diameter for Riemannian filling-discs and van
Kampen diagrams |
title_sort | extrinsic versus intrinsic diameter for riemannian filling discs and van kampen diagrams |
work_keys_str_mv | AT bridsonm extrinsicversusintrinsicdiameterforriemannianfillingdiscsandvankampendiagrams AT rileyt extrinsicversusintrinsicdiameterforriemannianfillingdiscsandvankampendiagrams |