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SUMMARY:Gaussian fluctuations for the open one-dimensional KPZ equation
DTSTART:20250401T140000
DTSTAMP:20260508T194516Z
UID:0e144ae7bb707348b8d1c5a5a65cb7316ca2d917c2adfe33ea30b2d0
CATEGORIES:Conferences - Seminars
DESCRIPTION:Andres A. Contreras Hip (University of Chicago)\nIn this talk 
 we consider the open one-dimensional KPZ equation on the interval $[0\,L]$
  with Neumann boundary conditions. For $L \\sim t^{\\alpha}$ and stationar
 y initial conditions\,  we obtain matching upper and lower bounds on the 
 variance of the height function for $\\alpha \\in [0\,\\frac23]$ for diffe
 rent choices of the boundary parameters. Additionally\, for fixed $L$ and 
 an arbitrary probability measure as initial conditions\, we show Gaussian 
 fluctuations for the height function as $t \\to \\infty$. Joint work with 
 Sayan Das and Antonios Zitridis.
LOCATION:MA B1 524
STATUS:CONFIRMED
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