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VERSION:2.0
X-WR-CALNAME:Claude LeBrun: \"Einstein Metrics\, Complex Surfaces\, and 
 Symplectic 4-Manifolds\"
PRODID:-//Apple Computer\, Inc//iCal 2.0//EN
CALSCALE:GREGORIAN
METHOD:PUBLISH
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TZID:America/New_York
LAST-MODIFIED:20090420T233038Z
BEGIN:DAYLIGHT
DTSTART:20090308T070000
TZOFFSETTO:-0400
TZOFFSETFROM:+0000
TZNAME:EDT
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BEGIN:STANDARD
DTSTART:20091101T020000
TZOFFSETTO:-0500
TZOFFSETFROM:-0400
TZNAME:EST
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BEGIN:VEVENT
DURATION:PT1H
LOCATION:Math 520\, Columbia University
DTSTAMP:20090420T233033Z
UID:7666F49B-1E21-4A0B-B526-5D01054BAF5F
SEQUENCE:6
URL;VALUE=URI:http://math.columbia.edu/~lipshitz/SGGT/
DTSTART;TZID=America/New_York:20090501T154500
SUMMARY:Claude LeBrun: \"Einstein Metrics\, Complex Surfaces\, and Sympl
 ectic 4-Manifolds\"
DESCRIPTION:Abstract: An Einstein metric is by definition a Riemannian m
 etric of constant Ricci curvature. One would like to completely determin
 e which smooth compact n-manifolds admit such metrics. In this talk\, I 
 will describe recent progress regarding the 4-dimensional case. These re
 sults specifically concern 4-manifolds that also happen to carry either 
 a complex structure or a symplectic structure.
ORGANIZER;CN="Robert Lipshitz":mailto:lipshitz@math.stanford.edu
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