Columbia-Princeton Probability Day 2021

Columbia-Princeton Probability Day 2021


Friday, May 7, 2021.

 

 
Zoom link: 
https://columbiauniversity.zoom.us/j/97155561297?pwd=b3RUUElQekZNN3pDQTVGRElRb0dKUT09
 
 
  Schedule (all times are in eastern time (NYC time)):

10:00-10:25 Guillaume Remy (Columbia)
Probabilistic construction of conformal blocks for Liouville CFT
10:30-10:45 Jiacheng Zhang (Princeton)
Superposition and mimicking theorems for conditional McKean-Vlasov equations
10:45-11:00 Weitao Zhu (Columbia)
Upper-tail large deviation principle of the ASEP
11:10-11:35 Carsten Chong (Columbia)
The Parabolic Anderson Model with Lévy noise: Existence, Moments, and Intermittency
11:40-11:55 Lingfu Zhang (Princeton)
A cutoff transition for repeated averages
11:55-12:10 Shuangping Li (Princeton)
Proof of the Contiguity Conjecture and Lognormal Limit for the Symmetric Perceptron
   
1:00-1:25 Duncan Dauvergne (Princeton)
Infection spread in a sea of random walks
1:30-1:45 Sayan Das (Columbia)
Large deviations for discrete beta-ensembles
1:45-2:00 Suqi Liu (Princeton)
Phase transition in noisy high-dimensional random geometric graphs
2:10-2:35 Konstantin Matetski (Columbia)
Directed mean curvature flow in noisy environment
2:40-2:55 Shalin Parekh (Columbia)
An operator formulation of Strassen's Law
2:55-3:10 Graeme Baker (Princeton)
On processes converging to the supercooled Stefan problem
3:30-3:55 Evgeni Dimitrov (Columbia)
Characterization of Gibbsian line ensembles
4:00-4:15 Scander Mustapha (Princeton)
Trend to equilibrium for the granular media equation under non-convex potentials
4:20-4:45 Fan Wei (Princeton)
Graph irregularity strength – a probabilistic construction
 

For further information, please contact the organizers.