dc.contributor.author
Adiprasito, Karim Alexander
dc.date.accessioned
2018-06-07T22:05:53Z
dc.date.available
2013-06-21T13:07:20.104Z
dc.identifier.uri
https://refubium.fu-berlin.de/handle/fub188/8865
dc.identifier.uri
http://dx.doi.org/10.17169/refubium-13064
dc.description.abstract
The purpose of this thesis is to study classical objects, such as polytopes,
polytopal complexes, and subspace arrangements. We will tackle problems, old
and new, concerning them. We do so by using some of the new tools that have
been developed in combinatorial topology, especially those tools developed in
connection with (discrete) differential geometry, geometric group theory and
low-dimensional topology.
de
dc.description.abstract
In dieser Arbeit werden Methoden der metrischen Geometrie, der
Differentialgeometrie und der kombinatorischen Topologie benutzt um klassische
Probleme in der Theorie der Polytope, der Theorie der polytopalen Komplexe und
der Theorie der Unterraumarrangements zu lösen.
en
dc.format.extent
XV, 97 S.
dc.rights.uri
http://creativecommons.org/licenses/by-nc-nd/3.0/deed.de
dc.subject
Hirsch conjecture
dc.subject
Realization spaces
dc.subject
Subspace arrangements
dc.subject
Algebraic topology
dc.subject.ddc
500 Naturwissenschaften und Mathematik::510 Mathematik::516 Geometrie
dc.subject.ddc
500 Naturwissenschaften und Mathematik::510 Mathematik::514 Topologie
dc.subject.ddc
500 Naturwissenschaften und Mathematik::510 Mathematik::512 Algebra
dc.title
Methods from Differential Geometry in Polytope Theory
dc.contributor.firstReferee
Günter M. Ziegler
dc.contributor.furtherReferee
Gil Kalai
dc.date.accepted
2013-05-27
dc.identifier.urn
urn:nbn:de:kobv:188-fudissthesis000000094499-2
dc.title.translated
Differentialgeometrische Methoden in der Polytoptheorie
en
refubium.affiliation
Mathematik und Informatik
de
refubium.mycore.fudocsId
FUDISS_thesis_000000094499
refubium.mycore.derivateId
FUDISS_derivate_000000013600
dcterms.accessRights.dnb
free
dcterms.accessRights.openaire
open access