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DTSTART:20250330T030000
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DTSTAMP:20260424T090519Z
UID:66855965cb925549226419@ist.ac.at
DTSTART:20241118T154500
DTEND:20241118T164500
DESCRIPTION:Speaker: Jason Miller\nhosted by M. Beiglböck\, N. Berestycki\
 , L. Erdös\, J. Maas\, F. Toninelli\, E. Schertzer\nAbstract: We consider
  the conformal loop ensembles ($\\CLE_\\kappa$) in the regime $\\kappa \\i
 n (4\,8)$ which is the range of parameter values so that the loops interse
 ct themselves\, each other\, and the domain boundary.  We show that there
  is a canonical conformally covariant and geodesic metric defined in the g
 asket of a $\\CLE_\\kappa$ (its “intrinsic metric”)\, the set of point
 s which are not surrounded by any of the loops.  We conjecture that this 
 metric describes the scaling limit of the intrinsic metric associated with
  discrete lattice models which converge in the limit to $\\CLE_\\kappa$ fo
 r $\\kappa \\in (4\,8)$ (e.g.\, two-dimensional critical percolation).  B
 ased on joint works with Valeria Ambrosio and Yizheng Yuan.
LOCATION:Central Bldg / O1 / Mondi 2a (I01.O1.008)\, ISTA
ORGANIZER:boosthui@ist.ac.at
SUMMARY:Jason Miller: Towards the scaling limit of the intrinsic metric for
  two-dimensional critical percolation clusters
URL:https://talks-calendar.ista.ac.at/events/5090
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