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dc.contributor.authorHuisken, Gerhard
dc.date.accessioned2016-09-23T13:40:06Z
dc.date.available2016-09-23T13:40:06Z
dc.date.issued2007
dc.identifier.urihttp://publications.mfo.de/handle/mfo/481
dc.description.abstractThe current article arose from a lecture1 given by the author in October 2005 on the work of R. Hamilton and G. Perelman on Ricci-flow and explains central analytical ingredients in geometric parabolic evolution equations that allow the application of these flows to geometric problems including the Uniformisation Theorem and the proof of the Poincare conjecture. Parabolic geometric evolution equations of second order are non-linear extensions of the ordinary heat equation to a geometric setting, so we begin by reminding the reader of the linear heat equation and its properties. We will then introduce key ideas in the simpler equations of curve shortening and 2-d Ricci-flow before discussing aspects of three-dimensional Ricci-flow.en_US
dc.language.isoen_USen_US
dc.publisherMathematisches Forschungsinstitut Oberwolfachen_US
dc.relation.ispartofseriesOberwolfach Preprints;2007,01
dc.relation.ispartofseriesOberwolfach Lecture;2005
dc.subjectOberwolfach Lectureen
dc.titleGeometric flows and 3-manifolds : Oberwolfach Lecture 2005en_US
dc.typePreprinten_US
dc.rights.licenseDieses Dokument darf im Rahmen von § 53 UrhG zum eigenen Gebrauch kostenfrei heruntergeladen, gelesen, gespeichert und ausgedruckt, aber nicht im Internet bereitgestellt oder an Außenstehende weitergegeben werden.de
dc.rights.licenseThis document may be downloaded, read, stored and printed for your own use within the limits of § 53 UrhG but it may not be distributed via the internet or passed on to external parties.en
dc.identifier.doi10.14760/OWP-2007-01
local.series.idOWP-2007-01
dc.identifier.urnurn:nbn:de:101:1-2008062778
dc.identifier.ppn164616251X


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