Jingning Liu, Mei Zhang
Published 2017-12-25Version 1
In this paper, a branching random walk $(V(x))$ in the boundary case is studied, where the associated one dimensional random walk is in the domain of attraction of an $\alpha-$stable law with $1<\alpha<2$. Let $M_n$ be the minimal position of $(V(x))$ at generation $n$. We established an integral test to describe the lower limit of $M_n-\frac{1}{\alpha}\log n$ and a law of iterated logarithm for the upper limit of $M_n-(1+\frac{1}{\alpha})\log n$.
Weak convergence for the minimal position in a branching random walk: a simple proof
The almost sure limits of the minimal position and the additive martingale in a branching random walk
A note on the critical barrier for the survival of $α-$stable branching random walk with absorption
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