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UID:20260415T194957EDT-6057ZUEugI@132.216.98.100
DTSTAMP:20260415T234957Z
DESCRIPTION:Title: Minimal surfaces in symmetric spaces\n\nAbstract: For S 
 a closed surface of genus at least 2\, Labourie proved that every Hitchin 
 representation of pi_1(S) into PSL(n\,R) gives rise to an equivariant mini
 mal surface in the corresponding symmetric space. He conjectured that uniq
 ueness holds as well (this was known for n=2\,3)\, and explained that if t
 rue\, then the space of Hitchin representations admits a mapping class gro
 up equivariant parametrization as a holomorphic vector bundle over Teichmu
 ller space.\n\nAfter giving the relevant background\, we will discuss the 
 analysis and geometry of minimal surfaces in symmetric spaces\, and explai
 n how certain large area minimal surfaces give counterexamples to Labourie
 ’s conjecture.\n\nJoin Zoom Meeting\n\nhttps://us06web.zoom.us/j/831804539
 14?pwd=RQnoWH7aQqXAxldXZsqdafFCmh7dBC.1\n\nMeeting ID: 831 8045 3914\n\nPa
 sscode: 719821\n\nWhere: CRM\, room 5340\n\nPavillon André-Aisenstadt\, Un
 iversité de Montréal\n\n \n
DTSTART:20231006T180000Z
DTEND:20231006T190000Z
SUMMARY:Nathaniel Sagman (University of Luxembourg) 
URL:https://www.mcgill.ca/mathstat/channels/event/nathaniel-sagman-universi
 ty-luxembourg-351580
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