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UID:20260407T050701EDT-7210R8Gvwr@132.216.98.100
DTSTAMP:20260407T090701Z
DESCRIPTION:Title: Calabi-Yau manifolds with maximal volume growth\n\nAbstr
 act: Calabi-Yau manifolds with maximal volume growth are complete Ricci-fl
 at Kähler manifolds where any r-ball has volume at least r^m up to a unifo
 rm constant factor and m is the real dimension of the manifold. Bishop-Gro
 mov volume comparison theorem implies that such growth is indeed maximal. 
 This notion generalizes the more well-known notion of asymptotically conic
 al (AC) manifolds. Contrary to the AC case\, the asymptotic cones at infin
 ity in general can have non-isolated singularities. In this talk\, I will 
 give a (biased) survey of the recent progress on this ongoing topic.\n\nht
 tps://uqam.zoom.us/j/98999725241\n\n \n\nWeb site : https://cirget.uqam.ca
 /fr/seminaires.html\n
DTSTART:20230127T160000Z
DTEND:20230127T170000Z
SUMMARY:Shih-Kai Chiu (Oxford University)
URL:https://www.mcgill.ca/mathstat/channels/event/shih-kai-chiu-oxford-univ
 ersity-345516
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