BEGIN:VCALENDAR VERSION:2.0 PRODID:researchseminars.org CALSCALE:GREGORIAN X-WR-CALNAME:researchseminars.org BEGIN:VEVENT SUMMARY:Shih-Kai Chiu (Oxford University) DTSTART:20230127T160000Z DTEND:20230127T171500Z DTSTAMP:20260423T022742Z UID:CIRGET/84 DESCRIPTION:Title: Calabi-Yau manifolds with maximal volume growth\nby Shih-Kai Chiu (Oxf ord University) as part of CRM - Séminaire du CIRGET / Géométrie et Top ologie\n\nLecture held in PK-5115.\n\nAbstract\nCalabi-Yau manifolds with maximal volume growth are complete Ricci-flat Kähler manifolds where any r-ball has volume at least r^m up to a uniform constant factor and m is th e real dimension of the manifold. Bishop-Gromov volume comparison theorem implies that such growth is indeed maximal. This notion generalizes the mo re well-known notion of asymptotically conical (AC) manifolds. Contrary to the AC case\, the asymptotic cones at infinity in general can have\nnon-i solated singularities. In this talk\, I will give a (biased) survey of the recent progress on this ongoing topic.\n LOCATION:https://researchseminars.org/talk/CIRGET/84/ END:VEVENT END:VCALENDAR