Agenda de la FDP

Séminaire de Probabilités et Théorie Ergodique

Le vendredi à 11h00 - Salle 1180 (Bât E2)(Tours)
Responsables : ,
First passage percolation in hostile environment (on hyperbolic graphs)
Elisabetta Candellero (Univ. Warwick)www
vendredi 23 février 2018 - 10h45 - Salle 1180 (Bât E2)(Tours)

Résumé :
We consider two first-passage percolation processes FPP_1 and FPP_{\lambda}, spreading with rates 1 and \lambda > 0 respectively, on a non-amenable hyperbolic graph G with bounded degree. FPP_1 starts from a single source at the origin of G, while the initial con figuration of FPP_{\lambda} consists of countably many seeds distributed according to a product of iid Bernoulli random variables of parameter \mu > 0 on V (G)\{o}. Seeds start spreading FPP_{\lambda} after they are reached by either FPP_1 or FPP_{\lambda}. We show that for any such graph G, and any fixed value of \lambda > 0 there is a value \mu_0 = \mu_0(G,\lambda ) > 0 such that for all 0 < \mu < \mu_0 the two processes coexist with positive probability. This shows a fundamental difference with the behavior of such processes on Z^d. (Joint with Alexandre Stauffer.)