Preserving Positive Isotropic Curvature

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dc.contributor.authorAndrews, Benen
dc.contributor.authorHopper, Christopheren
dc.date.accessioned2025-12-31T20:41:25Z
dc.date.available2025-12-31T20:41:25Z
dc.date.issued2011en
dc.description.abstractThe condition of positive curvature on totally isotropic 2-planes was first introduced by Micallef and Moore [MM88].en
dc.description.statusPeer-revieweden
dc.format.extent24en
dc.identifier.isbn9783642159664en
dc.identifier.issn0075-8434en
dc.identifier.otherORCID:/0000-0002-6507-0347/work/162948195en
dc.identifier.scopus85072851933en
dc.identifier.urihttps://hdl.handle.net/1885/733798125
dc.language.isoenen
dc.publisherSpringer Verlagen
dc.relation.ispartofThe Ricci Flow in Riemannian Geometry: A Complete Proof of the Differentiable 1/4-Pinching Sphere Theoremen
dc.relation.ispartofseriesLecture Notes in Mathematicsen
dc.rightsPublisher Copyright: © 2011, Springer-Verlag Berlin Heidelberg.en
dc.subjectBianchi Identityen
dc.subjectOrthonormal Basisen
dc.subjectRicci Flowen
dc.subjectRiemannian Manifolden
dc.subjectSectional Curvatureen
dc.titlePreserving Positive Isotropic Curvatureen
dc.typeBook chapteren
dspace.entity.typePublicationen
local.bibliographicCitation.lastpage258en
local.bibliographicCitation.startpage235en
local.contributor.affiliationAndrews, Ben; Mathematical Sciences Institute Research, Mathematical Sciences Institute, ANU College of Systems and Society, The Australian National Universityen
local.contributor.affiliationHopper, Christopher; University of Oxforden
local.identifier.doi10.1007/978-3-642-16286-2_14en
local.identifier.essn1617-9692en
local.identifier.pure02fa2466-c460-4e0a-a82f-6c6a325ac70cen
local.identifier.urlhttps://www.scopus.com/pages/publications/85072851933en
local.type.statusPublisheden

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