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DTSTART:20250330T030000
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BEGIN:VEVENT
DTSTAMP:20260424T125734Z
UID:68b00f3b1917e303175096@ist.ac.at
DTSTART:20251010T133000
DTEND:20251010T142000
DESCRIPTION:Speaker: Bálint Vető\nhosted by Laszlo Erdös\, Jan Maas\nAbs
 tract: The random walk web distance is a natural directed distance on the 
 trajectory of coalescing simple random walks. It is given by the number of
  jumps between different random walk paths when one is only allowed to mov
 e in one direction. The Brownian web distance is the scale-invariant limit
  of the random walk web distance and it can be described in terms of the B
 rownian web. It is integer-valued and has scaling exponents 0:1:2 as compa
 red to 1:2:3 in the KPZ world. The shear limit of the Brownian web distanc
 e is still given by the Airy process. A weighted version of the random wal
 k web distance converges to a new explicit distribution that interpolates 
 between the Gaussian and the GUE Tracy-Widom distribution. Based on joint 
 work with Blint Virg.
LOCATION:Central Bldg / O1 / Mondi 2a (I01.O1.008)\, ISTA
ORGANIZER:boosthui@ist.ac.at
SUMMARY:Bálint Vető: The Brownian Web Distance
URL:https://talks-calendar.ista.ac.at/events/5973
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