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Flow by mean curvature of slowly rotating liquid drops toward stable energy minimisers

dc.contributor.authorWilkin-Smith, Nigel
dc.date.accessioned2015-12-08T22:18:49Z
dc.date.issued2009
dc.date.updated2016-02-24T11:54:59Z
dc.description.abstractWe establish sufficient conditions for uniqueness in the context of an energy minimisation property derived earlier by the author for rotating liquid drops of arbitrary dimension. In particular, we obtain unique, global solutions of an associated geometric evolution equation whenever appropriate restrictions are placed on an initial condition corresponding to a fixed angular velocity. These solutions are demonstrated to converge smoothly to a known stable minimal equilibrium, and we prove that the boundary of each such energy minimiser is uniquely determined in a Lipschitz neighbourhood of the unit sphere.
dc.identifier.issn0025-5874
dc.identifier.urihttp://hdl.handle.net/1885/31517
dc.publisherSpringer
dc.sourceMathematische Zeitschrift
dc.subjectKeywords: 49Q10; 76B45; 76U05; Mathematics Subject Classification (2000): 53C44
dc.titleFlow by mean curvature of slowly rotating liquid drops toward stable energy minimisers
dc.typeJournal article
local.bibliographicCitation.lastpage774
local.bibliographicCitation.startpage743
local.contributor.affiliationWilkin-Smith, Nigel, College of Physical and Mathematical Sciences, ANU
local.contributor.authoruidWilkin-Smith, Nigel, u2523165
local.description.embargo2037-12-31
local.description.notesImported from ARIES
local.identifier.absfor010110 - Partial Differential Equations
local.identifier.ariespublicationu9209279xPUB83
local.identifier.citationvolume262
local.identifier.doi10.1007/s00209-008-0398-2
local.identifier.scopusID2-s2.0-67651065426
local.type.statusPublished Version

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