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TZID:Europe/Vienna
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DTSTART:20250330T030000
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DTSTAMP:20260404T015746Z
UID:66ab5b5c76175427746357@ist.ac.at
DTSTART:20241105T163000
DTEND:20241105T173000
DESCRIPTION:Speaker: Daniele Semola\nhosted by Jan Maas\nAbstract: Let $(M\
 ,g)$ be a smooth\, complete Riemannian manifold with nonnegative Ricci cur
 vature\, Euclidean volume growth\, and quadratic Riemann curvature decay w
 hich is not isometric to $\\mathbb{R}^n$. I will discuss joint work with G
 ioacchino Antonelli and Marco Pozzetta where we prove that there exists a 
 set $\\mathcal{G}\\subset (0\,\\infty)$ with density one at infinity such 
 that for each volume $V\\in\\mathcal{G}$ there is a unique isoperimetric r
 egion with volume $V$ inside $M$.
LOCATION:Office Bldg West / Ground floor / Heinzel Seminar Room (I21.EG.101
 )\, ISTA
ORGANIZER:boosthui@ist.ac.at
SUMMARY:Daniele Semola: Uniqueness on average of large isoperimetric sets i
 n noncompact manifolds with nonnegative Ricci curvature
URL:https://talks-calendar.ista.ac.at/events/5321
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