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dc.contributor.authorDavila, Juan*
dc.contributor.authorDel Pino, Manuel*
dc.contributor.authorDolbeault, Jean*
dc.contributor.authorMusso, Monica*
dc.contributor.authorWei, Juncheng*
dc.date.accessioned2020-01-21T10:01:11Z
dc.date.available2020-01-21T10:01:11Z
dc.date.issued2019
dc.identifier.urihttps://basepub.dauphine.fr/handle/123456789/20449
dc.language.isoenen
dc.subjectPatlak-Keller-Segel systemen
dc.subjectchemotaxisen
dc.subjectcritical massen
dc.subjectblow-upen
dc.subjectinfinite time blow-upen
dc.subjectinner-outer gluing schemeen
dc.subjectrateen
dc.subjectblow-up profileen
dc.subject.ddc515en
dc.titleInfinite time blow-up in the Keller-Segel system: existence and stabilityen
dc.typeDocument de travail / Working paper
dc.description.abstractenThe simplest version of the parabolic-elliptic Patlak-Keller-Segel system in the two-dimensional Euclidean space has an 8π critical mass which corresponds to the exact threshold between finite-time blow-up and self-similar diffusion towards zero. Among functions with mass 8π, we find a neighborhood of a radial function such that any solution with initial condition in this neighborhood is globally defined and blows-up in infinite time with an explicit scaling involving the square root of the logarithm of the time.en
dc.publisher.nameCahier de recherche CEREMADE, Université Paris-Dauphineen
dc.publisher.cityParisen
dc.identifier.citationpages22en
dc.relation.ispartofseriestitleCahier de recherche CEREMADE, Université Paris-Dauphineen
dc.identifier.urlsitehttps://hal.archives-ouvertes.fr/hal-02394787en
dc.subject.ddclabelAnalyseen
dc.identifier.citationdate2019-12
dc.description.ssrncandidatenonen
dc.description.halcandidatenonen
dc.description.readershiprechercheen
dc.description.audienceInternationalen
dc.date.updated2019-12-19T10:59:59Z
hal.person.labIds84406*
hal.person.labIds84406*
hal.person.labIds60*
hal.person.labIds84406$$$109842*
hal.person.labIds251768*


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