比利时vs摩洛哥足彩
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university of california san diego
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math 288 - probability & statistics
pascal maillard
universit\'e paris-sud
fluctuations of the gibbs measure of branching brownian motion at critical temperature
abstract:
branching brownian motion is a prototype of a disordered system and a toy model for spin glasses and log-correlated fields. it also has an exact duality relation with the fkpp equation, a well-known reaction diffusion equation. in this talk, i will present recent results (obtained with michel pain) on the fluctuations of the gibbs measure at the critical temperature. by gibbs measure i mean here the measure whose atoms are the positions of the particles, weighted by their gibbs weight. it is known that this gibbs measure, after a suitable scaling, converges to a deterministic measure. we prove a non-standard central limit theorem for the integral of a function against the gibbs measure, for a large class of functions. the possible limits are 1-stable laws with arbitrary asymmetry parameter depending on the function. in particular, the derivative martingale and the usual additive martingale satisfy such a central limit theorem with, respectively, a totally asymmetric and a cauchy distribution.
host: tianyi zheng
may 10, 2018
10:00 am
ap&m 6402
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