The critical random walk snake in random conductances.
Alexandre LEGRAND
Institut Camille Jordan, Univ. Lyon 1
Date(s) : 07/01/2025 iCal
14h30 - 15h30
We are interested in the recurrence and transience of a branching random walk in Z^d indexed by a critical Galton-Watson tree conditioned to survive. When the environment is homogeneous, deterministic, and if the offspring distribution has a second moment, it is known to be recurrent for d at most 4, and transient for d larger than 4. In this talk we consider a random environment made of conductances, and we prove that, if the conductances satisfy suitable assumptions, the same result holds. The argument is based on the combination of a 0-1 law and a truncated second moment method, which only requires to have good estimates on the quenched Green’s function and heat kernel of a (non-branching) random walk in random conductances. This is a joint work with Christophe Sabot and Bruno Schapira.
Emplacement
I2M Saint-Charles - Salle de séminaire
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