Central limit theorem and Berry-Esseen bounds for a branching random walk with immigration in a random environment

Abstract

We consider a branching random walk on d-dimensional real space with immigration in a time-dependent random environment. Let Zn( t) be the so-called partition function of the process, namely, the moment generating function of the counting measure describing the dispersion of individuals at time n. For t fixed, the logarithm Zn( t) satisfies a central limit theorem. By studying the logarithmic moments of the intrinsic submartingale of the system and its convergence rates, we establish the uniform and non-uniform Berry-Esseen bounds corresponding to the central limit theorem, and discover the exact convergence rate in the central limit theorem.