Growth scales and uniform integrability of branching processes in varying environments
Abstract
We derive necessary and sufficient conditions for a sequence of constants (Cn)n ∈ N0 to be a growth scale of a branching process in (possibly defective) varying environments (Zn)n ∈ N0 in the sense that (Zn/Cn) is bounded from above and below with positive probability. Along the way, we derive a Kesten-Stigum type result - necessary and sufficient conditions for branching processes with varying environments to converge in L1 when normalised by their mean. The proofs exploit truncation and change of measure arguments, convergence of random series and martingale techniques.
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