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SUMMARY:Convergence of the normalized Kaehler-Ricci flow on Fano varieties
  - Vincent Guedj (Toulouse)
DTSTART:20120412T150000Z
DTEND:20120412T160000Z
UID:TALK36845@talks.cam.ac.uk
CONTACT:Dr. J Ross
DESCRIPTION:Let X be a Fano manifold whose Mabuchi functional is proper. A
  deep result of Perelman-Tian-Zhu asserts that the normalized Kaehler-Ricc
 i flow\, starting from an arbitrary Kaehler form in c_1(X)\, smoothly conv
 erges towards the unique Kaehler-Einstein metric.                         
                                                     \nWe will explain an a
 lternative proof of a weaker convergence result which applies to the broad
 er context of (log-)Fano varieties.                                       
        \n\nThis is joint work with Berman\, Boucksom\, Eyssidieux and Zeri
 ahi.  
LOCATION:MR2
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