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DTSTART:20240310T070000
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DTSTART:20231105T060000
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DTSTART;TZID=America/Toronto:20240314T143000
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URL:https://uwaterloo.ca/pure-mathematics-geometry-topology/events/steady-g
 radient-kahler-ricci-solitons-and-calabi-yau-metrics
SUMMARY:Steady gradient Kähler-Ricci solitons and Calabi-Yau metrics on C^
 n
CLASS:PUBLIC
DESCRIPTION:CHARLES CIFARELLI\, CIRGET & STONY BROOK\n\nI will present rece
 nt joint work with V. Apostolov on a new\nconstruction of complete stead
 y gradient Kähler-Ricci solitons on\nC^n\, using the theory of hamiltonia
 n 2 forms\, introduced by\nApostolov-Calderbank-Gauduchon-Tønnesen-Friedm
 an\, as an Ansatz. The\nmetrics come in families of two types with distinc
 t geometric\nbehavior\, which we call Cao type and Taub-NUT type. In parti
 cular\, the\nCao type and Taub-NUT type families have a volume growth rate
  of r^n\nand r^{2n-1}\, respectively. Moreover\, each Taub-NUT type family
 \ncontains a codimension 1 subfamily of complete Ricci-flat metrics.\n\nMC
  5417
DTSTAMP:20260314T211837Z
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