On Seneta-Heyde Scaling for a stable branching random walk
Abstract
We consider a discrete-time branching random walk in the boundary case, where the associated random walk is in the domain of attraction of an α-stable law with 1<α<2. We prove that the derivative martingale Dn converges to a non-trivial limit D∞ under some regular conditions. We also study the additive martingale Wn, and prove n1αWn converges in probability to a constant multiple of D∞.
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