Bootstrap percolation and kinetically constrained spin models: critical time scales

Probabilités et Statistique

Lieu: 
Salle séminaire M3-324
Orateur: 
Cristina Toninelli
Affiliation: 
LPSM, Sorbonne Université
Dates: 
Mercredi, 21 Novembre, 2018 - 10:30 - 11:30
Résumé: 
Recent years have seen a great deal of progress in understanding the behavior of bootstrap percolation models, a particular class of monotone cellular automata. In the two dimensional lattice there is now a quite complete understanding of their evolution starting from a random initial condition, with a universality picture for their critical behavior. Much less is known for their non-monotone stochastic counterpart, namely kinetically constrained models (KCM). In KCM each vertex is resampled (independently) at rate one by tossing a p-coin iff it can be infected in the next step by the bootstrap model. In particular infection can also heal, hence the non-monotonicity. Besides the connection with bootstrap percolation, KCM have an interest in their own : when p -> 0 they display some of the most striking features of the liquid/glass transition, a major and still largely open problem in condensed matter physics. I will discuss some recent results on the characteristic time scales of KCM as p -> 0 and the connection with the critical behavior of the corresponding bootstrap models.