Uniform Convergence of Martingales in the Branching Random Walk
Biggins, J. D.
Ann. Probab., Tome 20 (1992) no. 4, p. 137-151 / Harvested from Project Euclid
In a discrete-time supercritical branching random walk, let $Z^{(n)}$ be the point process formed by the $n$th generation. Let $m(\lambda)$ be the Laplace transform of the intensity measure of $Z^{(1)}$. Then $W^{(n)}(\lambda) = \int e^{-\lambda x}Z^{(n)}(dx)/m(\lambda)^n$, which is the Laplace transform of $Z^{(n)}$ normalized by its expected value, forms a martingale for any $\lambda$ with $|m(\lambda)|$ finite but nonzero. The convergence of these martingales uniformly in $\lambda$, for $\lambda$ lying in a suitable set, is the first main result of this paper. This will imply that, on that set, the martingale limit $W(\lambda)$ is actually an analytic function of $\lambda$. The uniform convergence results are used to obtain extensions of known results on the growth of $Z^{(n)}(nc + D)$ with $n$, for bounded intervals $D$ and fixed $c$. This forms the second part of the paper, where local large deviation results for $Z^{(n)}$ which are uniform in $c$ are considered. Finally, similar results, both on martingale convergence and uniform local large deviations, are also obtained for continuous-time models including branching Brownian motion.
Publié le : 1992-01-14
Classification:  Spatial growth in branching processes,  uniform local large deviations,  Banach space valued martingales,  60J80,  60F10,  60G42,  60G44
@article{1176989921,
     author = {Biggins, J. D.},
     title = {Uniform Convergence of Martingales in the Branching Random Walk},
     journal = {Ann. Probab.},
     volume = {20},
     number = {4},
     year = {1992},
     pages = { 137-151},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1176989921}
}
Biggins, J. D. Uniform Convergence of Martingales in the Branching Random Walk. Ann. Probab., Tome 20 (1992) no. 4, pp.  137-151. http://gdmltest.u-ga.fr/item/1176989921/