Seminar - A Branching-Selection Particle System: Hydrodynamic Limit and a Selection Principle

Topic: 
A Branching-Selection Particle System: Hydrodynamic Limit and a Selection Principle
Date & Time: 
Tuesday, April 19, 2016 - 11:00 to 13:00
Speaker: 
Pablo Groisman, University of Buenos Aires
Location: 
Room 264, Geography Building, 3663 Zhongshan Road North, Shanghai

The seminar is sponsored by NYU-ECNU Institute of Mathematical Sciences at NYU Shanghai.

 

Abstract:

We consider the following conservative particle system: N particles move on the line driven by independent brownian motions. In addition, at rate N two particles are chosen and the leftmost one jumps over the position of the rightmost one. This is a slight modification of one of the process considered by Brunet and Derrida to study the shift in the velocity of a front due to microscopic effects. For this system, we will prove propagation of chaos that leads to a hydrodynamic limit: the empirical cumulative distribution of the particles converges to a (deterministic) solution of the F-KPP equation. As a consequence we obtain that the cloud of particles travels at a velocity v_N that converges to the minimal velocity of the equation.

Biography:

Pablo Groisman is a Visiting Associate Professor of Mathematics at NYU Shanghai. He is also a tenured researcher at CONICET-Argentina and Professor at University of Buenos Aires. His research interests include stochastic processes, interacting particle systems and conditioned evolution.

Location & Details: 

Transportation Tips:

  • Taxi card
  • Metro:  Jinshajiang Road Station, Metro Lines 3/4/13 
  • Shuttle bus:
    From NYU Shanghai Pudong Campus, Click here
    From ECNU Minhang Campus, Click here