Branching random walk with a random environment in time

Abstract

We consider a branching random walk on R with a stationary and ergodic environment =(n) indexed by time n∈N. Let Zn be the counting measure of particles of generation n. For the case where the corresponding branching process \Zn(R)\ (n∈N) is supercritical, we establish large deviation principles, central limit theorems and a local limit theorem for the sequence of counting measures \Zn\, and prove that the position Rn (resp. Ln) of rightmost (resp. leftmost) particles of generation n satisfies a law of large numbers.