Cultural advice

The Australian National University acknowledges, celebrates and pays our respects to the Ngunnawal and Ngambri people of the Canberra region and to all First Nations Australians on whose traditional lands we meet and work, and whose cultures are among the oldest continuing cultures in human history.

Aboriginal and Torres Strait Islander peoples are advised that ANU Library collections may include images, names, voices, and other representations of deceased persons.

Material in the collection may contain terms, language or views that reflect the period in which the item was created and may be considered inappropriate today.

The F-Functional and Gradient Flows

dc.contributor.authorAndrews, Benen
dc.contributor.authorHopper, Christopheren
dc.date.accessioned2025-12-31T21:41:27Z
dc.date.available2025-12-31T21:41:27Z
dc.date.issued2011en
dc.description.abstractAfter Ricci flow was first introduced, it appeared for many years that there was no variational characterisation of the flow as the gradient flow of a geometric quantity. In particular, Bryant and Hamilton established that the Ricci flow is not the gradient flow of any functional on Met – the space of smooth Riemannian metrics – with respect to the natural L2 inner product (with the exception of the two-dimensional case, where there is indeed such an ‘energy’). Considering the prominent role variational methods have played in geometric analysis, pde’s and mathematical physics, it seemed surprising that such a natural equation as Ricci flow should be an exception. One of the many important contributions Perel’man made was to elucidate a gradient flow structure for the Ricci flow, not on Met but on a larger augmented space. Part of this structure was already implicit in the physics literature [Fri85]. In this chapter we discuss this structure, at the centre of which is Perel’man’s F-functional [Per02]. The analysis will provide the ground work for the proof of a lower bound on injectivity radius at the end of Chap. 11.en
dc.description.statusPeer-revieweden
dc.format.extent11en
dc.identifier.isbn9783642159664en
dc.identifier.issn0075-8434en
dc.identifier.otherORCID:/0000-0002-6507-0347/work/162948207en
dc.identifier.scopus85072870802en
dc.identifier.urihttps://hdl.handle.net/1885/733798134
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.subjectGradient Flowen
dc.subjectInjectivity Radiusen
dc.subjectNatural Equationen
dc.subjectRicci Flowen
dc.subjectRiemannian Metricsen
dc.titleThe F-Functional and Gradient Flowsen
dc.typeBook chapteren
dspace.entity.typePublicationen
local.bibliographicCitation.lastpage171en
local.bibliographicCitation.startpage161en
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_10en
local.identifier.essn1617-9692en
local.identifier.pureb5be236a-f89a-46d9-8ee0-099c88f0056den
local.identifier.urlhttps://www.scopus.com/pages/publications/85072870802en
local.type.statusPublisheden

Downloads

abcd