Convergence of martingale and moderate deviations for a 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 and Zn(t)=∫ etxZn(dx) be its Laplace transform. We show the Lp convergence rate and the uniform convergence of the martingale Zn(t)/ E[ Zn(t)|], and establish a moderate deviation principle for the measures Zn.
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