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Hyperbolic Knot Theory and Geometric Triangulations

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dc.contributor.advisor KALELKAR, TEJAS en_US
dc.contributor.author BHAT, MEGHA DINESH en_US
dc.date.accessioned 2022-05-12T10:15:44Z
dc.date.available 2022-05-12T10:15:44Z
dc.date.issued 2022-05
dc.identifier.citation 118 en_US
dc.identifier.uri http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/6876
dc.description.abstract We begin by studying hyperbolic geometry and hyperbolic structures on manifolds, looking at classical examples of hyperbolic manifolds and some important results on their structure and rigidity. We study hyperbolic knot complements, starting with methods to triangulate knot complements. We see how a triangulation by geometric simplices can give rise to a geometric structure on a manifold using Thurston's gluing and completeness equations. The structure of the various parts of a hyperbolic manifold is given by the Margulis theorem. Finally, we study the equivalence problem for knots in the 3-sphere and the homeomorphism problem for hyperbolic 3-manifolds using geometric triangulations. en_US
dc.language.iso en en_US
dc.subject Low Dimensional Topology en_US
dc.subject Hyperbolic Geometry en_US
dc.subject Triangulations en_US
dc.title Hyperbolic Knot Theory and Geometric Triangulations en_US
dc.type Thesis en_US
dc.type.degree BS-MS en_US
dc.contributor.department Dept. of Mathematics en_US
dc.contributor.registration 20171086 en_US


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  • MS THESES [1705]
    Thesis submitted to IISER Pune in partial fulfilment of the requirements for the BS-MS Dual Degree Programme/MSc. Programme/MS-Exit Programme

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