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UID:20251224T111849EST-7745V6pKSH@132.216.98.100
DTSTAMP:20251224T161849Z
DESCRIPTION:Title: Convex co-compact representations of 3-manifold groups.
 \n\nAbstract: Convex co-compact representations are a generalization of co
 nvex co-compact Kleinian groups. A discrete faithful representation into t
 he projective linear group is called convex co-compact if its image acts c
 o-compactly on a properly convex domain in real projective space. In this 
 talk\, I will discuss such representations of 3-manifold groups. I will pr
 ove that a closed irreducible orientable 3-manifold group admits such a re
 presentation only when the manifold is geometric (with Euclidean\, hyperbo
 lic\, or Euclidean x hyperbolic geometry) or when each component in its ge
 ometric decomposition is hyperbolic. This extends a result of Benoist abou
 t convex real projective structures on closed 3-manifolds. In each case\, 
 I will also describe the structure of the representation and the properly 
 convex domain. This is joint work with Andrew Zimmer.\n\nZoom ID: 989 1072
  6246\n	Password: delta\n\nLink: https://mcgill.zoom.us/j/98910726246?pwd=V
 HlzTzdTZGtqcHVuWGNKdys4d0FzQT09\n\n \n\n \n
DTSTART:20201125T200000Z
DTEND:20201125T210000Z
SUMMARY:Mitul Islam (University of Michigan)
URL:/mathstat/channels/event/mitul-islam-university-mi
 chigan-326385
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