Brown, ST;
(2017)
Geometric structures on negatively curved groups and their subgroups.
Doctoral thesis , UCL (University College London).
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Abstract
In this thesis, we investigate two explicit families of geometric structures that occur on hy- perbolic groups. After recalling some introductory material, we begin by giving an overview of the theory of special cube complexes, with a particular focus on properties of subgroups of hyperbolic special groups. We then describe an explicit algorithm, based on Stallings’ notion of folding for graphs, to construct a local isometry between cube complexes that represents the inclusion of a subgroup H ⊂ G , and show that this terminates if and only if the subgroup is quasiconvex. This provides a potential method by which quasiconvexity for various sub- groups could be verified. In the second part of the thesis, we investigate another family of geometric structures: negatively curved simplicial complexes. We show that groups satisfying a “uniform” C′(1/6) small cancellation condition have such a structure, and then move on to prove a gluing theo- rem (with cyclic edge groups) for these complexes. Using this theorem, we extend the family of groups known to be CAT(−1) to include hyperbolic limit groups, hyperbolic graphs of free groups with cyclic edge groups, and more generally hyperbolic groups whose JSJ components are 2-dimensionally CAT(−1).
| Type: | Thesis (Doctoral) |
|---|---|
| Title: | Geometric structures on negatively curved groups and their subgroups |
| Event: | UCL |
| Open access status: | An open access version is available from UCL Discovery |
| Language: | English |
| Keywords: | Geometric group theory, Hyperbolic groups, Cube complexes |
| UCL classification: | UCL > Provost and Vice Provost Offices UCL > Provost and Vice Provost Offices > UCL BEAMS UCL > Provost and Vice Provost Offices > UCL BEAMS > Faculty of Maths and Physical Sciences |
| URI: | https://discovery.ucl.ac.uk/id/eprint/1536359 |
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